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Contemp orary Mathematics

An Invitation to Toric Top ology: Vertex Four of a Remarkable Tetrahedron
Victor M Buchstaber and Nigel Ray

1. An Invitation Motivation. Sometime around the turn of the recent millennium, those of us in Manchester and Moscow who had been collaborating since the mid-1990s began using the term toric topology to describe our widening interests in certain well-behaved actions of the torus. Little did we realise that, within seven years, a significant international conference would be planned with the sub ject as its theme, and delightful Japanese hospitality at its heart. When first asked to prepare this article, we fantasised about an authoritative and comprehensive survey ; one that would lead readers carefully through the foothills above which the sub ject rises, and provide techniques for gaining sufficient height to glimpse its extensive mathematical vistas. All this, and more, would be illuminated by references to the wonderful Osaka lectures! Soon afterwards, however, reality took hold, and we began to appreciate that such a task could not be completed to our satisfaction within the timescale available. Simultaneously, we understood that at least as valuable a service could be rendered to conference participants by an invitation to a wider mathematical audience - an invitation to savour the atmosphere and texture of the sub ject, to consider its geology and history in terms of selected examples and representative literature, to glimpse its exciting future through ongoing pro jects; and perhaps to locate favourite Osaka lectures within a novel conceptual framework. Thus was born the Toric Tetrahedron T T , which identifies aspects of algebraic, combinatorial, and symplectic geometry as the precursors of toric topology, and symbolises the powerful mathematical bonds between all four areas. The Tetrahedron is the convex hull of these vertex disciplines, and every point has barycentric coordinates that measure the extent of their respective contributions. We introduce the vertices in chronological order (a mere two years separates
2000 Mathematics Subject Classification. Primary 57R19, 57S25; Secondary 14M25, 52B20, 53D20, 55P15. Key words and phrases. Davis-Januszkiewicz space, Hamiltonian geometry, homotopy colimit, moment-angle complex, quasitoric manifold, Stanley-Reisner algebra, subspace arrangement, toric geometry, toric variety.
c 0000 (copyright holder)

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VICTOR M BUCHSTABER AND NIGEL RAY

second and third), not least because time has acted like a Morse function in defining a flow down the 1­skeleton, as T T has emerged from the unknown. Such flows on convex polytopes play an important r^ in toric topology! Similar geometrical ole analogies have suggested other useful insights as we continue to refine our understanding of the Tetrahedron. So our primary aim is to issue a concise invitation to the study of T T , in which we avoid many technical details and offer an abbreviated bibliography. By way of compensation, we invite readers to sample influential publications for each of the vertex disciplines, and several of the edges and facets. We propose one or two which lie at their source , and a few important survey articles ; the latter combine expert overviews with comprehensive bibliographies. Throughout our discussion we view the torus as a unifying force that maintains the integrity of the Tetrahedron, and provides a bridge between its far-flung regions. The most common context for its actions lies in the theory of manifolds, which arise repeatedly in singular, smooth, and more highly structured forms. Before accepting our invitation, readers might also like to consult web-based resources which chart the rise of toric topology. These include: archives of Transpennine Topology Triangle meetings 18, 43, 56 and 59; the 2004 Keldysh Centenary Conference in Moscow; the Osaka meeting itself; and the Osaka City University Summer School. There is also the Manchester Toric Topology Page, and the conference page for New Horizons in Toric Topology that is scheduled to take place in Manchester during 2008. These may be found at www.greenlees.staff.shef.ac.uk/ttt/ttt.html keldysh-100.mi.ras.ru/ www.math.toronto.edu/~megumi/ToricTopology/ToricTopology2006.html www.ms.u-tokyo.ac.jp/~takahiko/summer school07/summer school.html www.maths.manchester.ac.uk/~nige/tortop.html www.mims.manchester.ac.uk/events/workshops/NHTT08/index.php respectively. We assume that readers have a basic knowledge of algebraic topology. Nevertheless, we emphasise our convention that homology and cohomology groups H (X ) and H (X ) of a topological space X are always reduced, and that their unreduced counterparts H (X+ ) and H (X+ ) require the addition of a disjoint basepoint. The same convention also holds for generalised theories such as cobordism and K -theory. During the last 18 months, many colleagues have helped us to prepare this work (sometimes unwittingly) and we thank them all. Those who deserve special mention include Tony Bahri, Galina Buchstaber, Kostya Feldman, and Taras Panov. We apologise in advance to any whose work we have omitted or misrepresented; no doubt such sins will be brought to our attention with due speed! We are also grateful to the editors of these Proceedings and their counterparts at the AMS for all their support and encouragement. 2. Background In order to present our invitation on a suitably decorative background, we offer some elementary observations on group actions. In spite of their simplicity they have been prominent in toric topology throughout its development, and have recently fed back into the original vertex disciplines to good effect. We therefore refer to them in terms that anticipate their reappearance below.


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The idea of a group G acting on a set of elements X has existed since Galois ushered in the revolutionary era of abstract algebra in the 1830s. The case in which X denotes a set of points and G a group of symmetries was studied forty years later by Klein, and proved to be an equally dramatic catalyst for the development of geometry. We draw inspiration from both points of view -- in particular, we consider the poset S (G) of subgroups of G, ordered by inclusion . We write any G-set as a pair (X, a), where a : G â X X is the function a(g , x) = g · x that describes the left action of symmetries g on points x. For each x X , we denote its isotropy subgroup by Gx G and its orbit by Gx X ; so G/Gx and Gx correspond bijectively, and Gw and Gx are conjugate in G for any w Gx. The partition of X into disjoint orbits is the kernel of the quotient function q : X X/G. A section for a is a right inverse s : X/G X of q , and is specified by choosing a preferred representative s(Gx) for each orbit; s determines a characteristic function s : X/G S (G), by s (Gx) = Gs(Gx) . Alternatively, suppose given a characteristic function : Q S (G) on an arbitrary set Q. The derived set of is defined by (2.1) D() = (G â Q)/ ,

where the equivalence relation is generated by (g , q ) (h, q ) whenever g -1 h (q ). So D() is a G-set with respect to the canonical action g · [h, q ] = [g h, q ], whose isotropy subgroups are given by G[h,q] = h(q )h-1 for any h G and q Q. The orbits are the subsets {[h, q ] : h G}, and pro jection D() Q onto the second factor is the associated quotient map; a canonical section is given by s(q ) = [1, q ] for any q Q. By definition, D() is initial amongst G-sets (X, aX ) equipped with functions X Q that are constant on orbits, and sections sX : Q X such that GsX (q) = (q ) for any q Q. Simple calculation confirms that the constructions D() and s are mutually inverse, and therefore that they establish a fundamental correspondence between characteristic functions and G-sets with sections. In particular, every choice of section s for (X, a) leads to a G-equivariant bijection fs : D(s ) - X , satisfying fs [g , Gx] = g · s(Gx). We refer to D(s ) as a derived form of (X, a). For any (X, a) with section s, we partition X/G by the kernel of s , and pull the partition back to X along the pro jection q . Similarly, for any characteristic function : Q S (G) we partition Q by the kernel of , and pull the partition back to D() along pro jection onto the second factor. These partitions are interchanged in the obvious fashion by the fundamental correspondence, and we refer to the blocks of all four as isotropy blocks. Now suppose that K G is a normal subgroup, and consider the surjection S (G) S (G/K ) of posets induced by taking quotients. Any characteristic function : Q S (G) pro jects to K : Q S (G/K ), and gives rise to a surjection rK : D() D(K ); by (2.1), rK is equivariant with respect to the actions of G and G/K , and the canonical section sK : Q D(K ) is given by rK · s. We may then interchange the r^ of G and G/K , by starting with an epimorphism e : H G oles that has kernel L, and lifting to e : Q S (H ). We obtain compositions (2.2)
K D() - D(K ) - Q

r

and

D(e ) - D() - Q ,

r

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VICTOR M BUCHSTABER AND NIGEL RAY

which factorise and extend the original quotient function q in turn. The corresponding compositions for G-sets are X X/K X/G and Y Y /L (Y /L)/G. In order to impose geometric flesh on these set theoretic bones, we proceed by assuming that a is a continuous action of the topological group G on a topological space X . Every isotropy subgroup is necessarily closed, so the characteristic map s : X/G C (G) takes values in the poset of closed subgroups, and is continuous with respect to the lower topology on C (G), whose subbasic closed sets are of the form H = {J | H J }. Thus -1 (H ) is closed in X/G, and its inverse image s under q is a component of the fixed point set Fix(H ) for any closed H G. Alternatively, suppose given a characteristic map : Q C (G) for some topological space Q. The derived space D() is obtained by topologising the derived set (2.1) so that pro jection onto Q is a quotient map; the inherited G-action and canonical section are then continuous, and D() is initial in the topological context. The constructions D() and s are mutually inverse, and define a fundamental topological correspondence between characteristic maps and G-spaces with sections. In particular, every choice of continuous section for an arbitrary G-space (X, a) leads to a G-equivariant homeomorphism fs : D(s ) - X ; as before, we refer to D(s ) as a derived form of (X, a). The closures of the isotropy blocks form coverings of X and D() by fixed point sets, and are identified by the fundamental correspondence. The closures of the quotient blocks in X/G and Q correspond similarly. As we explore T T , we impose increasingly stringent geometrical conditions on a, whose justification and significance will become apparent. The common philosophy is to view the quotient map q : X X/G as a singular G-bundle, and to interpret the geometry of X in terms of G and X/G using an appropriate derived form. This approach has a long and distinguished history in equivariant topology, and features in attempts such as those of J¨ h [62] and Davis [34] to classify Lie group actions anic on smooth manifolds. One additional aspect of the topological situation is important, namely the interplay between homotopy theory and the action a. For any topological group G there exist various functorial models for a contractible space E G on which G acts freely, and with closed orbits; any such E G is final amongst well-behaved free G-spaces and G-equivariant homotopy classes of maps. The quotient map E G E G/G is then a universal principal G-bundle, where E G/G = B G is a classifying space for G, and unique up to homotopy equivalence. Any G-space X may be replaced by the homotopy equivalent E G â X , on which G acts freely by g · (e, x) = (g · e, g · x). So pro jection onto the first factor represents the homotopy class of maps to the final ob ject, and classifies a principal G bundle over the quotient E G âG X . The latter space is the Borel construction on (X, a), otherwise known as the homotopy quotient, and is equivalent to X/G when G acts freely on X . In other cases, E G âG X has superior topological properties to X/G, and toric topology deals as much with homotopy quotients as with orbit spaces. These considerations illustrate the power of algebraic topology to generalise constructions that are purely algebraic. Whenever G is discrete, for example, the cohomology ring H (B G; Z) is isomorphic to the group theoretic cohomology of G. In consequence, Milnor's original version [74] of B G stimulated the development of continuous cohomology theory for topological groups.


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Henceforth, we restrict G to a compact n­dimensional torus T n unless otherwise stated, on the grounds that toroidal symmetry is implicit in many physical systems because the coordinates may be thought of as angles. We sometimes assume that X is an ob ject of a category that is particularly convenient for homotopy theory, such as the k -spaces of [96]. Examples. We now invite readers to consider three families of examples that illustrate our background principles in action. The first is a local model for many others, and the second and third are generalised and extended later. All three are based on the coordinatewise multiplication map µ : Cn â Cn Cn , defined by µ(y1 , . . . , yn , z1 , . . . , zn ) = (y1 z1 , . . . , yn zn ) for any n > 0. We abbreviate the set {1, . . . , n} to [n], and write the subspace {z | zi = 0 for i } as C Cn for any subset [n]. Similarly, we denote the / compact torus (S 1 ) by T (Câ ) , as a subspace of {z | zi = 0} C . Finally, we write C and T < Cn for the diagonal line and its unit subcircle respectively. Example 2.1. Let X be Cn , and a : T n â Cn Cn the restriction of µ. For n any z Cn , the isotropy subgroup Tz is T [n]\ , where is the unique subset of [n] â n for which z (C ) ; the orbit T z is the | |­dimensional torus T z . There is a homeomorphism h : Cn /T n Rn to the non-negative coordinate cone, induced by the formula (2.3) h(z1 , . . . , zn ) = (|z1 |2 , . . . , |zn |2 ), and the standard inclusion of Rn in Cn specifies a canonical section s : Rn Cn . The isotropy blocks are the subspaces (Câ ) Cn , whose closures C are the fixed point sets Fix(T [n]\ ). The blocks pro ject to the interiors of the corresponding faces R of the polyhedron Rn , whose closures are the faces themselves. The characteristic map s : Rn S (T n ) assigns the subtorus T [n]\ to the interior of the face R , and the derived form associated to s is the canonical homeomorphism fs : (T n â Rn )/ - Cn . Example 2.2. For any ordered pair (p, q ) of positive integers, let Z (p, q ) be the product of unit spheres S 2p+1 â S 2q+1 Cp+q+2 and a the product action of T p+1 â T q+1 . The orbit space is homeomorphic to the product p â q of standard simplices in Rp+1 â Rq+1 , by (2.3). Let K be the 2­torus T (p, q ) < T p+1 â T q+1 of points ( (t1 , . . . , t1 ), (t2 , . . . , t2 , t-1 t2 ) ) , 1 where t1 , t2 S 1 . Then M (p, q ) = Z (p, q )/T (p, q ) is a 2nd stage Dobrinskaya tower [40], and is a 2(p + q )­dimensional smooth manifold, equipped with an action of the quotient (p + q )­torus T p+q+2 /T (p, q ). The associated factorisation (2.2) takes the form Z (p, q ) M (p, q ) p â q ; many homotopic sections exist for the pro jection, because the product of simplices is contractible. The isotropy blocks of p â q corresponding to subtori T p+q-k are the relative interiors of the k ­dimensional faces, for 0 k p + q ; their closures are the faces themselves. The corresponding components of the fixed point sets in M (p, q ) are lower-dimensional 1st or 2nd stage towers. The coordinates induced on M (p, q ) take the form (x1 , . . . , xn ; u1 , . . . , up ), where x lies in p â q and u in T p+q ; they are singular over the boundary. All these structures on M (p, q ) lift to naturally to their counterparts in S 2p+1 â S 2q+1 .


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By construction, M (p, q ) is the pro jectivisation of the complex (q + 1)­plane bundle Cq over CP p , where is the canonical line bundle. So M (1, 1) is a 2nd stage Bott tower [53], and is diffeomorphic to a Hirzebruch surface; it is also the bounded flag manifold B2 [24], consisting of flags 0 < L1 < L2 < C3 for which L2 contains the first coordinate line; then (u, v ) T 2 acts on L1 by (1, v , uv ), and on L2 by (1, 1, u). The case q = 0 reduces to the quotient space S 2p+1 /T , and is diffeomorphic to CP p . In fact M (p, q ) may be extended to a k th stage tower, by iterating the pro jectivisation procedure, and replacing Cq with a sequence of more general bundles. The details are provided by Dobrinskaya [40], and require care. The corresponding bounded flag manifolds Bk are significant contributors to complex cobordism theory [23], [88], as we shall explain below. Example 2.3. Let X be Cn+1 \ 0, and a : Câ â (Cn+1 \ 0) (Cn+1 \ 0) the restriction of µ. The quotient space is the algebraic variety CP n , on which the algebraic torus (Câ )n acts with a single dense principal orbit. In this context, the toric coordinates identify CP n with an equivariant compactification of (Câ )n . 3. The Toric Triangle We now invite readers to focus on the oldest facet of the Toric Tetrahedron, which we label AC S and call the Toric Triangle. Each of the vertices A, C , and S represents appropriate aspects of a familiar discipline, whose key ideas and selected literature we introduce in this section. The edges of the triangle are populated with interdisciplinary work that involves two of the vertices in some proportion, and interior points represent activity that combines all three. The first vertex A. This is the original vertex of the Triangle, and represents algebraic geometry; or more specifically, the study of toric varieties. These appear to have been introduced in 1970 by Demazure [37], whose work is therefore the source of the entire Toric Tetrahedron. Demazure's constructions also became known as torus embeddings, and an early survey was provided by Danilov [33] in 1978. Twenty years later, Cox [30] popularised the term toric geometry for the expanding array of ideas that surrounded the vertex, and updated his survey in 2002 to take account of developments in more distant regions of T T [31]. The seminal books of Ewald [44], Fulton [50], and Oda [82] presented the topic to readers with little background in algebraic geometry, and showed singular examples to be as important as those that are smooth; indeed, the term toric manifold is sometimes used to distinguish the latter. For the sake of brevity, we restrict attention to compact toric varieties, whether singular or smooth. An essential ingredient of the toric geometer's worldview is the concept of a complete fan (which we abbreviate to fan henceforth). Every fan arises from m > n vectors in the integral lattice Zn < Rn , which determine m positive half-lines known as rays ; the rays intersect the unit sphere S n-1 Rn in m points. Initially, we insist that these be distributed so as to form the vertices of a simplicial subdivision K , none of whose faces contains antipodal points. The set of convex polyhedra obtained by taking the infinite cone on each face of K , with vertex the origin, is then a simplicial fan . By convention, {0} is included as the cone on the empty face . If we allow the cones to be spanned by linearly dependent rays, we obtain


AN INVITATION TO TORIC TOPOLOGY

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a less restricted notion of fan that is of sufficient generality for our purposes below; in every case, a fan decomposes Rn as a union of closed cones. For any fan in Rn , we may construct a compact toric variety X . It is covered by affine varieties X as ranges over the cones of , where X and X are glued along X whenever and have a common subcone . The algebraic torus (Câ )n acts compatibly on the X , and therefore on X ; in particular X{0} is naturally isomorphic to (Câ )n , and the action is by multiplication. Every cone contains the subcone {0}, so X{0} is dense in X and forms the principal orbit of the global action. There is also a natural map of posets from the cones of to the subtori of (Câ )n , ordered by inclusion. The construction of X in this fashion is tantamount to using the fan as a combinatorial blueprint for compactifying the principal orbit (Câ )n in such a way that coordinatewise multiplication extends to a (Câ )n -action. This viewpoint has been extremely influential during the growth of toric geometry. Associating X to actually establishes a fundamental varietal correspondence between general fans and compact toric varieties, and the algebraic properties of the fan are reflected in the geometry of the corresponding variety. If is simplicial, for example, then the singularities of X are homeomorphic to finite quotients of R2n , and the variety is an orbifold. If every cone is defined by rays that extend to a basis of Zn , then is regular, and X is smooth; and if K is the boundary of a convex simplicial polytope, then is polytopal, and X is pro jective. One of Demazure's motivations for introducing toric varieties was his interest in their algebraic isomorphisms, and he proved that Aut(X ) is a compact Lie group in any nonsingular case, with maximal torus T n < (Câ )n acting by restriction. Subsequently, his results were extended to toric orbifolds by Cox [29], and to the general case by Buhler. ¨ The orbit space Q of the maximal torus may be identified with a polyhedral ball in Rn , whose bounding sphere is subdivided by the dual of . Every subspace X pro jects onto the dual of the corresponding face of K ; in particular, X{0} pro jects onto the interior of the ball. Following Fulton [50, §4.1], for example, the underlying topological T n -space of X may then be expressed in derived form by means of a homeomorphism (3.1) f : (T n â Q )/ - X .

The image of the associated section is known to algebraic geometers as a canonical submanifold with corners, possibly singular, of X [82, §1.3]. If is polytopal, then Q is the corresponding simple polytope. Example 3.1. The simplest example of a toric manifold is, of course, given by n CP n , whose fan may be taken to be the n + 1 vectors e1 ,. . . , en , - j =1 ej in Rn ; it is regular and polytopal, being normal to the n-simplex on 0, e1 , . . . , en . More n generally, the vectors e1 ,. . . , en , -w j =1 ej form a fan for any nonnegative integer w; it is simplicial, but regular only when w = 1. For w > 1, the corresponding toric variety is an orbifold CP n (w, 1, . . . , 1), known as a weighted pro jective space, whereas the orbit space Q is an n­simplex for all values of w. We describe generalisations of CP n (w, 1, . . . , 1) in §5.


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The second vertex C . The study of geometrical ob jects such as regular polyhedra forms one of the oldest branches of mathematics, and reaches back thousands of years. Nevertheless, we invite readers to consider combinatorial geometry as the second vertex of T T , on the grounds that we shall focus on those aspects of the sub ject that have come of age since connections with toric varieties were first discovered. The edge AC was exposed in spectacular fashion by Stanley's solution [91] to one half of McMullen's conjecture in 1980; however brief, his work is the obvious source for the emergence and development of C as an independent vertex. Two of the most influential surveys of polytope theory have been Grunbaum's ¨ book [54], and Ziegler's more recent lectures of 1995 [99]. The latter is now quoted by authors working in many areas of T T , and emphasised the principle that simple polytopes are by far the most amenable to general discussion. More specific to the vertex C itself is Stanley's key text [92], where he transformed traditional invariants of polytope theory into powerful algebraic machinery for the study of abstract simplicial complexes K . His pivotal construction was the face ring R[K ], otherwise known as the Stanley-Reisner algebra of K , over a commutative ring R. Whenever possible we write the vertices of K as v1 , . . . , vm , and the vertex set as V ; we also assume that the faces V include the empty face . So K and imply that K . For algebraic purposes we often insist that the vertices are graded by real dimension 2, and rewrite subsets V as squarefree monomials vj in the polynomial algebra SZ (V ) on the vj . The face ring of K is then defined as the quotient SR (V )/( K ), and the set of monomials divisible / by faces of K forms an additive R-basis. In order to place McMullen's conjecture in context, we recall that the dual, or polar polytope P , of any simple polytope P is simplicial, and therefore bounded by a simplicial sphere KP . For example, the n-cube I n is simple, and its polar is the cross-polytope, whose boundary KI n triangulates S n-1 . This is also the duality of (3.1), because KP defines the normal fan of P , whose rays may be taken to be integral by small deformations of P if necessary. Historically, integral vectors f (P ) and h(P ) were defined for simple polytopes in terms of KP , as follows. For any simplicial complex K of dimension n - 1, let fj denote the number of faces of dimension j , for 0 j n - 1, and write f (K ) for the vector (f0 , . . . , fn-1 ); let f-1 = 1 count the empty face. Then define integers n n-1 hj for 0 j n by the polynomial equation j =0 hj tn-j = j =-1 fj (t - 1)n-1-j , and write h(K ) for the vector (h0 , . . . , hn ). Finally, let the g -vector g (K ) be given by (g0 , . . . , g[n/2] ), where g0 = 1 and gj = hj - hj -1 . In case K = KP , there is a beautiful Morse theoretic argument [17] involving flow along the 1-skeleton of P to show that the Dehn-Sommervil le equations (3.2) hj = hn-
j

for

0jn

n-1 always hold. The case hn = h0 is Euler's equation j =1 (-1)j fj = 1 + (-1)n-1 . Since 1959 [90] it has been possible to characterise integral vectors that realise f (K ) for some simplicial complex K . The corresponding problem for simplicial polytopes has a longer history, and the correct formulation was only achieved when McMullen stated his conjecture in 1971 [73]. Given an integral vector h, he proposed two requirements: firstly, that the Dehn-Sommerville equations (3.2) hold; and secondly, that the associated g -vector is of a combinatorial form referred to


AN INVITATION TO TORIC TOPOLOGY

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by Stanley as an M -vector. Stanley confirmed the necessity of McMullen's conditions, by proving that g (P ) is an M -vector for any simple polytope P . Sufficiency was established simultaneously by Billera and Lee [13], using completely different methods. McMullen's characterisation is now known as the g -theorem. The revolutionary aspect of Stanley's proof was his use of the toric variety X corresponding to the fan defined by KP . By construction, is both simplicial and polytopal, so X is a pro jective toric orbifold. The Danilov-Jurkiewicz theorem therefore describes its rational cohomology ring by means of an isomorphism (3.3) Q[KP ]/J - H (X ; Q) ,

where J denotes an ideal generated by linear terms associated to the rays of . If is regular, the integral version of (3.3) also describes the cohomology ring H (X ; Z). Stanley applied the hard Lefschetz theorem to H (X ; Q), and deduced the existence of a 2-dimensional cohomology class w with certain multiplicative properties. His proof concluded by showing that the coordinates gj of the g -vector measure the ranks of the 2j -dimensional components of the quotient ring H (X ; Q)/(w), and therefore that g is an M -vector. In this context, the Dehn-Sommerville equations are equivalent to rational Poincar´ duality for X . e The Dehn-Sommerville equations actually remain true for a considerably wider class of simplicial complexes, whereas restrictions on g -vectors are less easy to extend. For example, the conjecture that g (K ) is an M -vector for every simplicial sphere K appears still to be open. Similar mystery shrouds the f -vectors of convex polytopes; an explicit classification was given by Steinitz [93] for dimension 3 in 1906, yet the situation for dimension 4 remains obscure [100]! Since Stanley's initial applications, face rings with particular algebraic properties such as Cohen-Macauley or Gorenstein have become important test-beds for commutative algebra [18], and interest has grown in identifying simplicial complexes K for which Z[K ] is of a specific type. Relevant results include Reisner's Theorem [89], which supplies homological criteria for K to be Cohen-Macaulay; his criteria are satisfied by all simplicial spheres. For any simplicial complex K , the face poset L(K ) contains the faces of K , ordered by inclusion; the empty face is a minimal element, and the combinatorial type of K is determined by the isomorphism class of (K ). By analogy, the combinatorial type of an arbitrary polytope P is defined to be the isomorphism class of its face poset L(P ), which omits the empty face but includes the maximal face P itself. So for any simple polytope P , the opposite poset Lop (P ) is isomorphic to the face poset L(KP ). The f -, g -, and h-vectors of P are combinatorial invariants, because they depend solely upon L(P ), as do our applications to toric topology below. We therefore deal only with combinatorial polytopes henceforth, on the understanding that they may be represented by face posets or affine realisations as the occasion demands. We emphasise that n­dimensional polytopes in Rn may be combinatorially equivalent, but not affinely isomorphic. The third vertex S . The origins of symplectic structure may also be traced back down the years, as far as the profound reformulation of Newtonian mechanics that was begun by Lagrange, and continued by Hamilton during the first half of the 19th century. Hamilton's choice of coordinates q and p for phase space, representing position and momentum respectively, led eventually to the notion of a symplectic manifold (M , ). The phase space M is smooth, and is a closed


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VICTOR M BUCHSTABER AND NIGEL RAY

non-degenerate 2-form, whose existence forces the dimension of M to be even. Typical examples of symplectic manifolds include the total space of any cotangent bundle, which admits a canonical , and an arbitrary K¨ ahler manifold, equipped with the imaginary part of the defining metric. The former example illustrates the importance of noncompact phase spaces. Many mechanical systems admit groups of symmetries, which may be interpreted as diffeomorphisms of M 2n ; in the symplectic setting such symmetries preserve the 2-form, and are known as symplectomorphisms. Experience with classical systems such as pendulums and spinning tops suggests that effective Hamiltonian actions of a compact torus T k are important special cases, which require k n and determine a moment map : M Rk . Here Rk is realised as the dual Lie algebra of T k , and is constant on the T k -orbits. When the phase space is compact, Atiyah [3] and Guillemin and Sternberg [56] proved in 1982 that the image (M ) is always a convex polytope. These works are the source of the third vertex S , whose associated discipline is the symplectic geometry of toroidal symmetry, moment maps, and convex polytopes. The second edition [6] of Audin's book offers an inspirational survey of developments up to 2004. The overarching theme is Hamiltonian actions of tori, with special attention being paid to the half-dimensional case; in this situation, the real-valued coordinate functions of form a completely integrable system, and the associated torus action is called completely integrable. It follows that the fixed point set of any such action is nonempty, and that its elements are isolated. An important technique in Hamiltonian geometry is that of symplectic reduction, which compensates for the fact that the quotient of a symplectic manifold (M , ) by a Hamiltonian action of T k need not be symplectic. Reduction involves forming the level submanifold Z = -1 (x) of a regular value of the moment map, and imposing a symplectic structure on the quotient Z/T k , which is better behaved, and at worst an orbifold. For each factorisation of T k into a product of subtori, the reduction may be performed in corresponding stages. Symplectic reduction has played an important r^ in fully understanding the relationship between the verole tices A and S of the Tetrahedron, but enters rarely into our discussions below. We therefore refer interested readers to [6] for further details. The edge AC . After the existence of a wider toric world was revealed in [91], the edge AC was quickly colonised. One pioneer was Khovanskii, whose work [64], [65] resonated with that of Stanley by introducing torus actions into problems where none were initially apparent. Every monomial in n complex variables z1 , . . . , zn may be written as z for some integral vector (1 , . . . , n ). So any Laurent polynomial f (z ) = c z n defines a finite set A R containing those for which the coefficient c C is nonzero, and the Newton polyhedron of f is the convex hull of A. Now suppose that Wf (Câ )n is the complete intersection defined by a non-degenerate system f1 (z ) = · · · = fk (z ) = 0 of k n polynomial equations, with respective Newton polyhedra 1 , . . . , k . Khovanskii considered the problem of computing invariants such as the arithmetic genus (Wf ) in terms of the number of integral points interior to the j ; his results generalised Kushnirenko's theorem [6] for the case k , where Wf is discrete. He proceeded by forming the normal fan of the Minkowski sum of the j , interpreted the corresponding toric variety X as the compactification of (Câ )n , and proved that the closure cl(Wf ) X is nonsingular and conveniently


AN INVITATION TO TORIC TOPOLOGY

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embedded. He completed his computation by applying Ehler's description [43] of the Chern classes of a nonsingular toric variety (now settled on the edge AT ). Additional details may be found in [50, §5], for example. A more unconventional topic on this edge was furnished by work of Sturmfels and Sullivant[94], who considered the cut polytope Cut (G) associated to an arbitrary finite graph G = (V , E ), which is well-known in combinatorial optimization. It is rarely simple for larger graphs, so the pro jective toric variety XG determined by its normal fan is usually singular. The authors carried out experimental calculations in the ring H (XG : C), and discussed applications to algebraic statistics. The edge AS . The importance of the edge AS was demonstrated in 1988 by Delzant's characterisation [36] of non-singular pro jective toric varieties in terms of symplectic geometry. For any n-polytope P with regular normal fan (P ), he invested the toric variety X (P ) with a symplectic form for which the action of T n is completely integrable, and deduced that the image of the associated moment map recovers P . His proof proceeded by identifying X (P ) with the symplectic reduction associated to the moment map : Cm Rm-n of a certain (m - n)­dimensional subtorus K < T m that depends upon P . Delzant also established the uniqueness of his construction, by showing that any two compact, connected symplectic manifolds with completely integrable torus actions are Hamiltonian diffeomorphic whenever their moment maps have the same image. The edge CS . The existence of the edge C S emphasises the r^ of the moole ment map in linking classical examples of convex polytopes to the phase spaces of interesting mechanical systems. We shall discuss examples with a topological component in Section 5. We may also interpret Delzant's classification theorem as a fundamental symplectic correspondence between primitive polytopes and symplectic manifolds with completely integrable actions. This has been extended to weighted polytopes and symplectic toric orbifolds by Lerman and Tolman [69]. The facet ACS . A ma jor occupant of this facet is the study of arrangements A = {L1 , . . . , Lr } of subspaces Lj < Cm , which began before the advent of toric geometry, and may now be interpreted as a limit of activity within the interior of T T . The source is Arnold's calculation of the integral cohomology ring of the coloured braid group [2] in 1969, which stimulated a rapidly expanding interest in ( ) arrangements and their complements Cm \ j Lj , denoted by U (A). Because they arise as configuration spaces of various classical mechanical systems, their properties are central to many problems in algebraic, combinatorial, and symplectic geometry. An extensive general survey was produced by Bj¨ orner [14] in 1994, and several other overviews are available. In 1988 Goresky and MacPherson [51] determined the additive structure of H (U (A); Z), as a direct sum of homology groups associated to the intersection poset I (A). Subsequently, Cox [30, Theorem 4.1] showed how to interpret Delzant's constructions in terms of symplectic structure on the complements of a particular class of complex arrangements; these are now of ma jor importance to toric topology, and will also be discussed in Section 5.


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VICTOR M BUCHSTABER AND NIGEL RAY

4. Vertex Four - Toric Top ology Overview. Many phenomena associated with the Toric Triangle refer to topological spaces that are equipped with additional geometric structure, and it is natural to search for their analogues in a purely topological context. Such results are the substance of toric topology, our fourth vertex T , whose convex hull with AC S forms the Toric Tetrahedron. The pioneering work is due to Davis and Januszkiewicz in 1991, whose paper [35] is the source of toric topology. They introduced a class of well-behaved actions a of T n on 2n­dimensional manifolds M that are more amenable to topological analysis than those of toric geometry. Here we make the additional assumption that M and a are smooth, although such considerations and their consequences were left to readers in [35]. The pairs (M , a) are now known as quasitoric manifolds, and are defined by two conditions. The first is a weakening of the varietal structure by requiring only that a be local ly standard, and so ensures that M /T n is a manifold with corners; the second identifies the orbit space as a simple polytope P n . Since P n is contractible, a admits many smooth sections. The faces of the polytope are the closures of its isotropy blocks, amongst which the m facets Fj are distinguished by their dimension n - 1, and by the isotropy subcircles T (Fj ) < T n associated to their interiors, for 1 j m. Because P n is simple, every face G of dimension n - d is a unique intersection d=1 Fjk of d k facets; the isotropy subtorus T (G) < T n associated to its interior has rank d, and is the isomorphic image of the product âd=1 T (Fjk ). The facets lift to closed facial k submanifolds Xj M of dimension 2(n - 1), which are fixed by the circles T (Fj ) for 1 j m. The Xj intersect transversally, and G lifts to the closed submanifold d=1 Xjk of dimension 2(n - d), which we abbreviate to X (G) M ; it is fixed by k the d­torus T (G). Alternatively, suppose given a simple polytope P n with m facets Fj , and a characteristic map : P n T (T n ) to the poset of subtori. Assume that the kernel of partitions P n by the interiors of its faces, and associates a circle T (Fj ) < T n to the interior of the facet Fj , for 1 j m. Finally, suppose that the product map âd=1 T (Fjk ) T n is actually an isomorphism onto its image T (G) for every k face G = d=1 Fjk of P ; this is condition () of Davis and Januszkiewicz, which k guarantees that is determined by the circles T (Fj ). The derived manifold of is given by topologising (2.1) as (4.1) M () = (T n â P n )/ ,

where (g , p) (h, p) whenever g -1 h (p), and imposing the natural smooth structure suggested by Davis [34]. The canonical T n -action and the section s(q ) = [1, q ] are also smooth, and X (G) = (T n /T (G) â G)/ is a 2(n - d)­dimensional submanifold for any face G; it is fixed by the d-torus T (G). Conversely, any quasitoric manifold (M , a) with smooth section s admits a characteristic map s : P n T (T n ), where s (p) = T (G) for any p in the interior of G. These constructions are mutually inverse, and determine a fundamental quasitoric correspondence between characteristic maps and quasitoric manifolds. In particular, every choice of smooth section s for an arbitrary quasitoric manifold (M , a) leads to a T n -equivariant homeomorphism fs : M (s ) - M ,


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which may be upgraded to a diffeomorphism by appeal to [34]. As in [24], we refer to M (s ) as the derived form of (M , a). The derived manifold (4.1) is a version of Vinberg's construction [95], as adapted by Davis and Januszkiewicz. The characteristic map depends only on the combinatorial type of P , and may be reformulated in terms of face posets as an order reversing map : L(P n ) T (T n ), or an order preserving map : L(KP ) T (T n ). In the latter context, condition () specifies the values of on arbitrary faces of KP in terms of those on its m vertices. Whenever such exist, we deem P n and KP to be supportive, and describe the associated M () as lying over P n . But there are many unsupportive simple polytopes! An intriguing family of examples arises when KP is the n­dimensional n cyclic polytope Ck [99], for any number k of vertices satisfying k 2n ; in other words, no quasitoric manifolds can lie over the dual polytopes. In pursuing their cohomological calculations, Davis and Januszkiewicz defined an auxiliary space DJ (K ) for arbitrary simplicial complexes K , and proved the seminal fact that H (DJ (K )+ ; Z) realises the Stanley-Reisner algebra Z[K ]. Whenever P supports a quasitoric manifold (M , a), they exhibited an isomorphism (4.2) Z[KP ]/J - H (M+ ; Z)

[35, Theorem 4.14], where J is the ideal generated by the first Chern classes of n complex line bundles over DJ (KP ), associated to the isotropy subcircles of a. This is the toric topologist's version of the Danilov-Jurkiewicz theorem (3.3) for toric varieties. It arises from the fibration M - DJ (KP ) - B T n , which is built into Davis and Januszkiewicz's model for DJ (KP ) as the homotopy quotient E T n âT n M ; the homotopy type of the latter does not depend on the choice of (M , a). Philosophically, DJ (KP ) is the homotopy theorists' substitute for P n , whose T n -bundle E T n â M DJ (KP ) desingularises the quotient map. The construction of the second auxiliary space ZK in [35] was equally significant, and closely related to that of the derived manifold (4.1). It admits a canonical action a of T m , whose orbit space PK is the simple polyhedral complex dual to K ; if K = KP then PK = P n for any simple polytope. When KP is supportive, every characteristic map : PK T (T n ) satisfying condition () determines a subtorus K () < T m of dimension m - n that acts freely on ZK . The quotient n-torus T m /K () acts on the orbit space ZK /T m-n , which is readily identifiable with the derived quasitoric manifold M (). By varying the choice of , we run through a family of subtori K () < T m in the poset T (T ), and the corresponding factorisations ZK M () P n display all possible quasitoric manifolds over P n in the form of (2.2). From this point of view, the homotopy quotient E T m âT m ZK is a natural model for DJ (KP ), and may be identified with any E T n âT n M () by factoring out the freely acting subtorus K (). The next ma jor impact on the sub ject was made in 2002 by the survey of Buchstaber and Panov [20], which contains a wealth of fascinating extensions, generalisations, and applications of the ideas of [35]. Several of these were responsible for establishing new regions of T T , and are introduced in the context of the appropriate edges and faces below. So far as the vertex T is concerned, Buchstaber and Panov emphasised the importance of working with arbitrary simplicial complexes K , and constructed both DJ (K ) and the moment-angle complex ZK by more direct


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VICTOR M BUCHSTABER AND NIGEL RAY

and functorial methods, as unions of subspaces indexed by the faces of K . These were developed in [86] as diagrams over the face category cat(K ), whose ob jects are the faces of K and morphisms their inclusions. In particular, ZK and DJ (K ) were identified as homotopy colimits of certain exponential diagrams, which now underlie a homotopy theoretic industrial zone at the vertex T . Highlights. We have reached the most seductive passage of our invitation! As the Toric Tetrahedron has acquired form and substance, new areas of toric topology have been revealed, spawning examples, insights, and results that illuminate many topological phenomena. We present a small selection of our favourites. 1) Non-quasitoric manifolds. There is considerable insight to be gained from understanding why certain families of likely-looking manifolds cannot be quasitoric. We focus on the Milnor hypersurfaces Hj,k , for 1 j k . By definition, Hj,k CP j â CP k is the complex hypersurface dual to the tensor product 1 2 of the canonical line bundles over the respective factors. It has dimension 2(j +k -1), and may be realised by pro jectivising the stabilisation 1 Ck-j of the orthogonal j complement of 1 over CP . So its integral cohomology ring takes the form / (4.3) Z[x, y ] (xj +1 , y k + y k-1 x + · · · + y k-j xj ), where x is the pullback of the generator of H 2 (CP j ; Z) and y H 2 (Hj,k ; Z) is the first Chern class of the canonical line bundle along the fibre. If Hj,k is quasitoric then its cohomology ring takes the form (4.2), and y k-j (y j + y j -1 x + · · · + xj ) must lie in an ideal of H (Hj,k ; Z) generated by squarefree monomials and linear factors. A straightforward calculation shows that this is impossible; so Hj,k admits no suitable action of T j +k-1 . By way of comparison, consider the 2(j + k - 1)­dimensional quasitoric manifold Bj,k constructed in [23]. It is the quotient of (S 3 )j â S 2k-1 by the (j + 1)­ dimensional subtorus T (j, k ) < T 2j +k of points {(t1 , . . . , tj , t
j +1

,...,t

j +1

) : ti T for 1 i j + 1};

thus T (j, k ) acts freely. Pro jection onto (S 3 )j shows that Bj,k is the pro jectivisation of the complex k -plane bundle j Ck-j over the bounded flag manifold Bj of Example 2.2. So its integral cohomology ring takes the form / (4.4) Z[x1 , . . . , xj , y ] (xi (xi - xi-1 ), y k + y k-1 xj + · · · + y k-j xj : 1 i j ), j where xi is the pullback of the eponymous element in H 2 (Bj ); Z), and x0 = 0. A short calculation reveals that y k-j (y j + y j -1 xj + · · · + xj ) now factorises as j y
2j k-j

(y + x1 )(y - x1 + x2 ) . . . (y - xj

-1

+ xj )

in H (Bj,k ; Z). Note that j is the pullback of along its classifying map, which induces a monomorphism from (4.3) to (4.4) by mapping x to xj and fixing y . 2) Stably complex structures. Davis and Januszkiewic [35, §6] showed that every quasitoric manifold admits a stably complex structure, but did not remark that many inequivalent choices are possible. On bounded flag manifolds Bn , for example, some structures bound and others do not [27], with serious consequences for complex cobordism. To be precise, we invest (M , a) with an omniorientation [24], by choosing orientations for M itself, and for every facial submanifold Xj ; so there are 2m+1 omniorientations in total. The normal 2­plane bundle of every embedding Xj M is also oriented, and extends to a complex line bundle j over


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M for 1 j m, by the Pontryagin-Thom construction. An omniorientation gives rise to a unique isomorphism (M ) Cm-n m j , and hence to a canonical = j =1 stably complex structure on M . The additional structure is captured by a fundamental omnioriented correspondence, between omnioriented quasitoric manifolds and dicharacteristic homomorphisms : T F T n , where F denotes the set of m > n facets of an oriented combinatorial polytope P n , and obeys the analogue of condition (). There are 2m such homomorphisms for every characteristic map : P n T (T n ), because any isotropy circle (p) = T (F ) admits two isomorphisms TF T (F ) from the coordinate subcircle T F ; there is one for each orientation of T (F ), corresponding to the orientations of the X (F ) M (). Also, is represented on Lie algebras by an integral n â m matrix, which may be refined to [In : ] for some n â (m - n) matrix , by careful choice of bases. We label the pair (P, ) as the quasitoric combinatorial data [22] underlying the omnioriented quasitoric manifold M (). Example 4.1. In the case of CP 3 , the polytope P is 3 and n is 3; so m - n = 1 and is a 3­dimensional column vector. For the omniorientation induced by the standard toric varietal structure, this vector is (-1, -1, -1)t , whereas one of the 32 alternatives yields (+1, -1, +1)t . All three Chern numbers are nonzero in the first case, but zero in the second. For the Dobrinskaya tower M (3, 3) of Example 2.2, P is 3 â 3 and n is 6; ( )t so m - n = 2 and is 6 â 2. The omniorientation given by -1 -1 -1 -1 -1 -1 +1 +1 +1 +1 0 0 is induced by a toric varietal structure, and 3 of the 29 alternatives are given by negating one or both of the columns. 3) Complex cobordism. The Thom spectrum M U is universal amongst complex oriented ring spectra, and is one of the most important ob jects in stable homotopy U theory. Complex bordism ( · ) and cobordism U ( · ) are the associated homology and cohomology theories, and may be defined in terms of stably complex manifolds as explained by Conner and Floyd [28] and Quillen [87] respectively. The coefficient U U ring (M U ) is isomorphic to (S 0 ), and abbreviated to ; this is the celebrated complex cobordism ring, shown by Milnor [75] and Novikov [78] to be isomorphic to a graded polynomial algebra Z[zn : n 1], where zn has dimension 2n. Sum and product of cobordism classes are induced by disjoint union and cartesian product of manifolds respectively. No truly canonical choice of polynomial generators is known, although zp-1 may be represented by CP p-1 for any prime p; the remaining zn are represented by linear combinations of the Milnor hypersurfaces Hj,k , where j + k - 1. Such results are obtained by calculating Chern numbers, which completely determine complex cobordism classes. The essential feature of [23] was to exhibit omniorientations of the Bj,k to act as substitutes for the Milnor hypersurfaces. It follows that every complex cobordism class may be represented by a disjoint union of quasitoric manifolds. The connected analogue is considerably more subtle, and relies on the construction of connected sums that are compatible with omniorientations; this was finally achieved in [22], where every class of dimension greater than 2 is represented by an omnioriented quasitoric manifold. The analogous problem for connected algebraic varieties remains unsolved, having been posed by Hirzebruch in 1958. The value of these ideas lies in the principle that quasitoric representatives (M 2n , a) offer an alternative source of discrete data for any complex cobordism class. The fundamental omnioriented correspondence, for example, gives rise to


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VICTOR M BUCHSTABER AND NIGEL RAY

quasitoric combinatorial data (P, ), whereas the isolated fixed points of any T n action give rise to classical local invariants; theoretically, we may express the latter in terms of the former. A crucial case is that of the sign (x) = ±1 of any fixed point x. Its expression in terms of combinatorial data was obtained by Panov [83], and compares the global orientation of M with the orientation of the tangent space Tx (M ) induced by the n incident facial submanifolds. Signs are therefore indispensable for formulating the connected sum of quasitoric manifolds [22]. Alternatively, (x) compares the orientation underlying the stably complex structure on M with that induced on Tx (M ) by the T n -action; so (x) is always positive when M is complex or almost complex. The quasitoric manifolds Bn were introduced to complex cobordism theory in 1986 [88], as iterated sphere bundles with bounding omniorienations. They were U shown to represent the basis elements bn for (CP ), dual to powers un of the first cobordism Chern class. So their cartesian products Bi1 â · · · â Bik represent U the basis elements bi1 · · · bik for (B T k ), dual to monomials ui1 · · · uik . 1 k 4) Hirzebruch genera. Classic genera associated to complex analytic manifolds include the Euler characteristic and Todd genus. These were extended to almost complex manifolds, and thence to complex cobordism classes, as they became expressible in terms of Chern numbers [59]. In modern parlance, a Hirzebruch genus U is a homomorphism f : R of graded rings into any commutative R , and is equivalent to a formal group law over R [79]. Historically, f was specified by a formal power series t/ef (t) in R Q[[t]], and ef (t)) was identified with the exponential of the formal group law as soon as the concept was available [19], [80]. The construction and computation of genera and their equivariant analogues has a long and illustrious history [4], [5], [39], [58], [60], [65], [66], [68], [81]. A prime example is the universal toric genus , which may be evaluated on any 2n­dimensional T k -manifold (M , a) that carries a T k -equivariant structure c on its stable normal bundle. Then (M , a, c ) is given by the geometric cobordism class [E T k âT k M B T k ] in -2n (B T k ), and therefore takes the form U (4.5) gi1 ···ik ui1 · · · uik , where gi1 ···ik 2(n+i1 +···+ik ) . 1 k
U So g0...0 is precisely the cobordism class [M ] in 2n , and we may represent gi1 ...ik by a connected manifold that fibres over Bi1 â · · · â Bik with fibre M . Crucially, the base bounds, so we may relate the multiplicative properties of any Hirzebruch genus to the rigidity properties of its T k -equivariant extension. We may restrict attention to examples (M , a, c ) for which a has isolated fixed points only, and c is the complement of an equivariant structure c on its stable tangent bundle; these include all toric and quasitoric manifolds. In order to interpret (4.5) in terms of local invariants at each fixed point x, we require the sign (x) (in the alternative form above) and the weight vectors w1 (x), . . . , wn (x) of the representation of T k in Tx (M ). The resulting localisation formula is

(4.6)

(M , , c ) =


x

(x)

n j =1

( [wj (x)](u1 , . . . , un ) )

-1

where x ranges over the fixed point set of a and [wj (x)](u1 , . . . priate multivariable wj -series for the universal formal group law. irregular part of (4.6) must vanish imposes severe restrictions the weight vectors. The formula reduces to the S 1 version of [25],

, uj ) is the approThe fact that the possible signs and and was obtained


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by Krichever [67] for almost complex manifolds (so (x) = 1). It was applied in [26] to determine the complex bordism classes of classical homogeneous spaces. For quasitoric manifolds we have k , and the signs and weights may be described explicitly in terms of the combinatorial data (P, ); the descriptions simplify significantly for pro jective toric varieties. Masuda [70] and Panov [83] also obtained formulae evaluating Hirzebruch's original y -genus in terms of combinatorial data. Both confirmed the well-known fact that every smooth toric variety has Todd genus 1, in contrast to the arbitrary integral values attainable on quasitoric manifolds. 5) cat(K )-diagrams. The appropriate framework for the study of toric homotopy types is that of diagrams over the face category cat(K ), meaning covariant functors such as the exponential diagrams X K top of [86]. Here top denotes a category of pointed topological spaces such as k -spaces [96], of which X is an ob ject. Also, X K ( ) is the cartesian product X , and X K ( ) is the inclusion X X induced by assigning the basepoint to the additional coordinates. In case X is the classifying space T of the circle, colimtop B T K is precisely Buchstaber B and Panov's construction K B T for DJ (K ) [20]. The corresponding descriptions of ZK and its quotients is subtler - and more revealing. Consider the diagram T V \K : cat(K ) top, for which T V \K ( ) is the torus T V \ and T V \K ( ) is the pro jection T V \ T V \ ; then colimtop T V \K is a point. There is a more complex diagram DK , for which DK ( ) is the subspace (D2 ) â T V \ of the product of 2-disks (D2 )V , and DV ( ) is the corresponding inclusion (D2 ) âT V \ (D2 ) âT V \ . The pro jection DK ( ) T V \K ( ) is a homotopy equivalence for every , and induces a map colimtop DK colimtop T V \K ; yet colimtop DK is Buchstaber and Panov's construction for ZK [20]. This example shows how badly colimits behave under ob jectwise homotopy equivalences, but also suggests a remedy. The homotopy colimit of T V \K is defined by constructing a cofibrant replacement diagram such as DK , and taking its ordinary colimit; in other words, the simpler diagram provides a weak equivalence hocolimtop T V \K ZK . This procedure always works in favourable circumstances, although finding an appropriate cofibrant replacement may be difficult. For spaces X such as CWcomplexes, the exponential diagram X K is already cofibrant, so we may also write DJ (K ) as hocolimtop B T K . On the other hand, any quotient of ZK by a subtorus T l < T V gives rise to a weak equivalence hocolimtop T V /l ZK /T l , where T V /l ( ) is T V \ / Im(T l ). In particular, this expresses any quasitoric manifold M as a homotopy colimit, and extends the corresponding result [97, Proposition 5.3] for toric varieties, where homotopy colimits and toric geometry were first associated. The close relationship between derived forms and homotopy colimits actually hinges on the fact that the nerve of cat(K ) is the cone on the barycentric subdivision of K , and may therefore be identified with the polyhedral complex PK . Homotopy colimits over cat(K ) are sometimes preserved by the standard functors of algebraic topology, so long as they can be defined in the target category. The consequences of these ideas are studied in [85], along with many algebraic and geometrical examples associated to the vertex T . 6) Homotopy types. Explicit calculations of homotopy types fall into the three standard categories of increasing complexity; rational, p-adic, and integral.


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VICTOR M BUCHSTABER AND NIGEL RAY

The rational homotopy type of any simply connected space X is most efficiently encoded by Sullivan's minimal model, which is a well-structured commutative differential graded algebra that is quasi-isomorphic to the commutative cochain algebra A L (X ) [47]. Spaces whose minimal models may be constructed directly from P their rational cohomology algebras are known as formal, and play a central r^ in ole rational homotopy theory. Important examples include spheres, compact connected Lie groups, and compact K¨ ahler manifolds. The rationalisation of any DJ (K ) or quasitoric manifold M retains significant homotopy theoretic information. A result of [76] confirms that DJ (K ) is formal for arbitrary K , and is applied in [85] to deduce the formality of M ; indeed, the argument extends to cases such as the torus manifolds of [71]. By way of contrast, moment-angle complexes cannot generally be formal, as follows from Baskakov's discovery [10] of nontrivial Massey products in their rational cohomology for certain K . His calculations employed the bigraded chain complex of ZK discussed in [20], and have since been extended by Denham and Suciu [38]. Minimal models for DJ (K ) have been exhibited only for iterated joins of simplices and boundaries of simplices [76], in which case the cohomology ring is a complete intersection and uniquely determines the simply connected rational homotopy type. So far as p-adic results are concerned, the p-completion of DJ (K ) is uniquely determined by its mod-p cohomology ring Fp [K ] whenever K is a join of skeleta of simplices [77]. This holds for any prime p, and combines with the rational results to show integral uniqueness for complete intersections. The integral homotopy type of the ZK has long been of interest to combinatorialists, as we shall explain in our discussion of the face AC T . Work of Grbi´ and c Theriault [52] showed that ZK is weakly equivalent to a wedge of spheres whenever K is obtained by iterated pushouts of shifted complexes. We may then interpret crucial elements of (DJ (K )) in terms of the homotopy quotient fibration T
m

- Z

K

- DJ (K ) .

In particular, (DJ (K )) contains many Whitehead products, both iterated and generalised, that directly reflect the combinatorial structure of K . The possibility of analysing stable homotopy types has also been raised by [8], which considers homotopy decompositions of the suspensions ZK and their generalisations. These should be compared with earlier splittings of suspensions of k th stage Bott towers into wedges of Thom complexes over lower stages [27], and analogous splittings for Dobrinskaya towers. 7) Oriented cohomology theories. The integral cohomology of any DJ (K ) or quasitoric manifold M 2n is free, so evaluating a complex oriented cohomology theory E ( · ) on either space is relatively straightforward. Nevertheless, it is convenient to assume that the coefficient ring E = E is concentrated in even dimensions, and free of additive torsion. Then E (DJ (K )+ ) is isomorphic to the face ring E [K ], for example, because the corresponding Atiyah-Hirzebruch spectral sequence collapses. Given any simple polytope P and dicharacteristic homomorphism : T F T n , the cohomology ring of the derived quasitoric manifold is given by an isomorphism / E [KP ] JE - E (M ()+ ), where J E is the ideal generated by the first E -theory Chern classes of the n complex line bundles of (4.2). These bundles are tensor products, so their Chern classes


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embody the formal group law associated to E ( · ). The resulting formulae are conceptually straightforward, and have been obtained independently by Strickland and the authors. Complex cobordism and complex K -theory are good examples, involving the universal and multiplicative formal group laws respectively, although detailed calculations with the former may require ma jor technical expertise. One U U remarkable consequence is that the -module (M ) is generated by embedded quasitoric submanifolds for any quasitoric manifold M . Computing the KO -theory of these spaces is much more difficult. A significant start was made by Bahri and Bendersky [7], who found a degree of order amidst the algebraic chaos of their Adams spectral sequence approach. In particular, they proved that KO (M ) is additively isomorphic to a sum of KO -modules of two types; namely KO (S 2i ) for 0 i n, and KO ( 2j CP 2 ) for 0 j n - 2. The splitting depends only on the cohomology ring H (M ; Z/2), and leads to the BB numbers p and q , which enumerate the summands of the first and second type respectively. More specific calculations were carried out in [27] for certain families of Bott towers, whose KO -algebra structures and BB numbers were determined. The most general setting for these attempts is that of quaternionic oriented co homology theory, for which quaternionic cobordism S p ( · ) is the universal exam ple. Neither the quaternionic cobordism ring nor the module structure of S p (CP n ) are known, so any applications to toric spaces are extremely interesting, but well out of current reach. 5. New Faces - and Beyond Having introduced the fourth vertex T , we conclude our invitation by advertising the seven new faces it defines, and speculating on future trends that should further increase the allure of the Tetrahedron. The edge AT . Even before the vertex T was properly identified, several toric geometers had strayed along the edge AT in their desire to investigate topological invariants of toric varieties. For example, Ehler's formula [43] for the Poincar´ e duals of the Chern classes of a nonsingular toric variety was utilised in Khovanskii's work [65] on the edge AC . His formula represents the dual of ck ( (M 2n )) by the sum of the fundamental classes G X (G) in H2n-2k (M+ ; Z), taken over all the 2(n - k )­dimensional facial submanifolds of M . It extends immediately to quasitoric manifolds, so long as M is omnioriented and the X (G) are invested with the induced U omniorientations. Indeed, the formula may then be interpreted in 2n-2k (M+ ), and computes the the duals of the universal complex cobordism Chern classes. Toric topologists have also visited AT , as exemplified by [22]. The authors prove that any complex cobordism class may be represented by the quotient of a free torus action on a real quadratic complete intersection. The importance of the real quadratic viewpoint has recently been emphasised by Bosio and Meersseman [16], in their construction of families of non-K¨ ahler complex manifolds using ZK . The edge CT . Exploration of the edge C T motivated much of Buchstaber and Panov's survey [20]. Their results include a notable generalisation of the DehnSommerville equations (3.2), for which they applied Poincar´ duality to prove e ( )(n) hj - hn-j = (-1)n-j (K ) - (S n-1 ) j


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VICTOR M BUCHSTABER AND NIGEL RAY

for any triangulated (n - 1)­manifold K , and 1 j n. It follows that the hj - hn-j are homotopy invariants, and independent of the triangulation. This edge is also a natural habitat for Halperin's well-known toral rank conjecture, concerning the largest integer trk(X ) for which a finite-dimensional topological space X admits an almost free T trk(X ) -action. Every isotropy subgroup is necessarily finite, and the conjecture states that dim H (X+ ; Q) 2trk(X ) . If the conjecture holds, then it follows from [21] that any (n - 1)­dimensional simplicial complex K on vertices [m] satisfies the inequality ( ) (5.1) dim H (K ; Q) 2m-n - 1 , where ranges over the subsets of [m], and the K are induced subcomplexes. When K is the boundary of n , for example, the right hand side of (5.1) is 1, and equality holds. Computer calculations confirming the exponential growth required by the conjecture for cyclic polytopes are currently in progress by Gadjikurbanov. The edge ST . The edge S T is becoming densely populated, as realisation dawns that global properties of Hamiltonian actions are as much a part of equivariant topology as of the symplectic geometry that nurtured their growth. This viewpoint is expounded by Guillemin, Ginzburg and Karshon [55], who provide a beautiful survey of many exciting aspects of S T , and initiate several new ideas that stray into adjacent faces of the Triangle. For example, the famous Duistermaat-Heckman formula [42] n e(x), wj (x), -1 (5.2) e, n = (2 )n n!
M x M
T

j =1

is associated to the process of symplectic reduction, and is well known to mathematical physicists as the exact stationary phase formula. Atiyah and Bott and Berligne and Vergne proved that it is also a special case of a localisation formula of equivariant cohomology that arises in the presence of isolated fixed points; further explanation is given in [55], for example. From this viewpoint, (5.2) is closely related to the universal toric genus (4.6), as is evident from their formal similarity. These considerations are relevant to the topology of symplectic circle-actions on a compact symplectic M . In dimension 4, McDuff proved that any such action is Hamiltonian if and only if the fixed point set is nonempty, and gave a 6­dimensional non-Hamiltonian example whose fixed point sets are 2-tori. Subsequently, Feldman [46] studied the case of isolated fixed points, and deduced that the Todd genus of M is necessarily 1 or 0; if 1, the action is Hamiltonian, and if 0, it is not. The facet ACT . This facet is home to the development of a special class of subspace arrangements, as introduced on AC S ; here too, work represents the limit of activity within the interior of T T . For any subset [m] we write the coordinate subspace {z : zj = 0 if j } as L C m (otherwise known as C[m]\ in Example 2.1). So an arbitrary simplicial complex K on vertices [m] determines the coordinate subspace arrangement {L : K }, with complement U (K ). So T m acts on U (K ) coordinatewise, and / we may interpret U globally as a diagram of T m -spaces on the category of subcomplexes of the (m - 1) simplex on vertices [m], for every m > 0. The relevance of U to T T is epitomised by [20, Theorem 8.9], which establishes a natural T m -equivariant


AN INVITATION TO TORIC TOPOLOGY

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deformation retraction U (K ) ZK . In other words, we may study homotopy theoretic properties of moment-angle complexes purely in terms of coordinate subspace arrangements. In particular, we obtain smooth structures on the ZK , Well before this link was established, Ziegler and Zivaljevi´ [101] brought the c theory of homotopy colimits to bear, and rederived Goresky and MacPherson's algebraic decomposition of H (U (A); Z). For the case U (K ), their ideas lie behind our current formulation of ZK as a homotopy colimit over cat(K ). For coordinate subspace arrangements, the decomposition of H (U (K ); Z) was also recovered in [11] by applying a theorem of Hochster, and the link with ZK was exploited to deduce the multiplicative structure; similar results were obtained independently by Franz [48]. The algebraic decomposition has recently been realised topologically, by splitting ZK [8]. Further techniques of unstable homotopy theory are now being focused on moment-angle complexes in this context. For example, iterated and generalised Samelson products in the loopspaces ZK are under consideration, and their relationship with the geometry of the arrangement and the combinatorics of K promises to be particularly fruitful. Other questions that were originally posed in the era of torus embeddings have also been formulated and solved in the context of the facet AC T . One such is the weak Oda conjecture of 1978, concerning the factorisation of proper equivariant birational maps of nonsingular toric varieties into sequences of well-behaved blow-ups and blow-downs. The conjecture may be approached using combinatorial topology, because any bistel lar move on the simplicial complex K corresponds to a combinatorial operation on the fan , and thence to a blow-up and blow-down on X . It was verified in 1997 by Morelli and Wlodarczyk [98], who proved that any two regular fans in Rn are connected by a sequence of bistellar operations through regular fans. The result was then extended to other nonsingular varieties by a process of torification [1]. The facet AST . The facet AS T may not yet have acquired a distinctive literature, but two topics suggest themselves as candidates. For any symplectic manifold (M , ), let Diff (M ) denote the group of diffeomorphisms of the underlying smooth manifold, and consider the subgroups Ham(M , ) < Sym(M , ) < Diff (M ) of Hamiltonian diffeomorphisms and symplectomorphisms respectively. Algebraic, geometric and homotopy theoretic properties of these groups are discussed in McDuff 's survey of 2003 [72], but many questions remain open. It is therefore natural to consider examples in which M admits the action of a compact Lie group [63]; in particular, the situation for toric varieties and quasitoric manifolds has aroused recent interest. Harada and Landweber's study [57] of the equivariant K -theory of Hamiltonian T n -spaces should also be located in this facet. The facet CST . A beautiful circle of ideas that typify the facet C S T arises from the action by conjugation of the unitary group U (n) on the vector space space H of n â n Hermitian matrices. The orbit H of the diagonal matrix d(1 , . . . , n ) is diffeomorphic to the (n2 - n)­dimensional flag manifold of complete flags in Cn , and admits a standard symplectic structure. The natural left action of T n < U (n) is Hamiltonian, and we may identify the corresponding moment map with the


22

VICTOR M BUCHSTABER AND NIGEL RAY

restriction to H of : H Rn , which associates to any Hermitian matrix its vector of diagonal entries. A classical theorem of Schur and Horn [6] asserts that the image (H ) is the convex hull of the n! points obtained by permuting the coordinates of (1 , . . . , n ) in Rn . The resulting simple convex polytope n-1 is the famous permutahedron [99], and a section for is given by lifting each of its points p to the corresponding diagonal matrix d(p). 2(n-1) Now consider the manifold J of n â n tridiagonal Hermitian matrices, with distinct eigenvalues 1 , . . . , n . According to [15], there is a non-standard 2(n-1) embedding J H that serves as a symplectic reduction; the restriction of the symplectic form on H is non-degenerate, and the restriction of the moment 2(n-1) map is a completely integrable system. In particular, J is a toric and quan-1 sitoric manifold over . Furthermore, the permutahedron is the polar of the barycentric subdivision of n-1 , and is therefore (n - 1)-colourable. It follows 2(n-1) from [35, Corollary 6.10] that J is stably parallelisable, and hence of serious interest to stable homotopy theorists. The interior. The interior of T T is relatively uncharted, but exploratory settlements have been established and several further expeditions are under way. Panov's work [84] is a recent example, which aims to exploit the relative ease with which topologists construct the factorisation ZK M PK of (2.2) for any quasitoric manifold M . Analogues for algebraic varieties and completely integrable torus actions were obtained by several authors in the early 1990s, as described by Cox [30]. The results may be interpreted as providing homogeneous coordinates for the varieties in question, but depend on the notions of categorical quotient and symplectic reduction respectively. Panov achieved a more satisfying unification by adapting the concept of Kempf-Ness set from the theory of algebraic group actions on affine varieties, and applying it to the coordinate subspace pair (U (K ), ZK ). His procedure works for toric orbifolds, and is closest to the motivating example in the case of pro jective toric varieties. A more established exploration of the interior concerns the pursuit of mirror symmetry, first observed by theoretical physicists. Originally formulated as the identification of partition functions on a pair of Calabi-Yau manifolds (V , V ), the sub ject became intertwined with toric geometry under the influence of Batyrev, as summarised in his seminal paper [12], for example. In 1999, Cox and Katz published an entertaining survey [32] from the algebraic viewpoint. A convex polytope P in Rn is reflexive if it is integral, contains the origin in its interior, and has integral polar P ; then P is also reflexive. Following the construction of [64] in the case of a single generic hypersurface, Batyrev conjectured that the corresponding pair (XP , XP ) of toric varieties is mirror symmetric. By defining stringy Hodge numbers for reasonable singular varieties, he proposed an extension of the simplest topological test for smooth pairs (V , V ) to be mirror symmetric, and proved that any (XP , XP ) satisfies his test. Work on his conjectures is ongoing. An inspection of the bibliography of [49] confirms that the sub ject lies close to the the facet AC S ; nevertheless, it has a small but significant T -coordinate. Many examples in mirror symmetry involve toric orbifolds, which arise algebraically from a class of simplicial fans and topologically from characteristic functions that fail to satisfy Davis and Januszkiewicz's condition ().


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Example 5.1. Following Example 2.2, let Z be S 2n+1 Cn+1 , and a the coordinatewise action of T n+1 . For any vector of positive integers (1 , . . . , n+1 ), let H be the subcircle T () < T n+1 of points {(t1 , . . . , t

n+1

) : t T },

and M the quotient space S 2n+1 /T (); so M is acted on by the quotient n­torus T = T n+1 /T (). In this case M is the weighted projective space CP n (), and reduces to the standard pro jective space CP n in case = (1, . . . , 1). Weighted pro jective spaces have inspired an impressive literature of their own, with links to each of the vertex disciplines; [41] is a well-known survey . Recent work is increasingly topological, and includes the calculation [9] of the equivariant cohomology ring HT (CP n (); Z); this doubles as a face ring for the weighted quotient simplex of [69], and is described by generators and relations in terms of piecewise polynomials on the associated fan. It is also isomorphic to the Chow ring of CP n (). Further research into the algebraic topology of quasitoric orbifolds is under active development, and includes applications of weighted lens spaces, homotopy colimits, weighted face rings, and the Bousfield Kan spectral sequence, together with calculations in K -theory and cobordism. The topic certainly appears to merit inclusion deep within the interior of the Tetrahedron. So far as future trends are concerned, applications to the motion planning problem of robotics look especially intriguing. Moment-angle complexes ZK are known to engineers as configuration spaces of planar linkages [61], and their topological complexity measures the instability of algorithms for determining paths between initial and final states of the system [45]. Bounds on the topological complexity depend on the homotopy type and cohomological structure of ZK , and are therefore within reach for certain specific K . Beyond T T . Experience shows that toric ob jects provide concrete realisations of abstract concepts in all four vertex disciplines, which not only stimulate the interests of experts, but are also attractive and comprehensible to a general mathematical audience. Such reasons suggest that the study of T T will continue to flourish. We therefore extend one final invitation to future authors, to engage in the light-hearted but enlightening exercise of determining the toric coordinates of their own lectures and publications. It seems likely that T T will eventually be subdivided as areas acquire sufficient theory, literature, and distinction to merit a separate identity. But we cannot imagine notation to accommodate this process! It is also fascinating to speculate on whether additional vertices lie buried in the future -- although mathematical and theoretical physicists' increasing involvement suggests that vertex P may soon emerge. We encourage readers to dream of a Toric Four-Simplex, and entertain us with their fantasies at future toric conferences . . . References
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