Книга | Страницы для поиска |
Kharazishvili A.B. - Strange functions in real analysis | |
Nagel R. - One-parameter semigroups of positive operators | 13, 62, 94, 105, 403 |
Kadison R.V., Ringrose J.R. - Fundamentals of the theory of operator algebras (vol. 1) Elementary Theory | 79 |
Taylor M.E. - Partial Differential Equations. Basic theory (vol. 1) | 476 |
Rudin W. - Fourier Analysis on Groups | 260 |
Hunter J.K., Nachtergaele B. - Applied Analysis | 126 |
Gray R.M. - Probability, Random Processes and Ergodic Properties | 53, 102 |
Rudin W. - Principles of Mathematical Analysis | 332 |
Reed M., Simon B. - Methods of Modern mathematical physics (vol. 1) Functional analysis | 39 |
Brylinski J.-L - Loop Spaces, Characteristic Classes and Geometric Quantization | 161 |
Shorack G.R. - Probability for statisticians | 104, 174 |
Chung T.J. - Computational fluid dynamics | 255, 619 |
Zinn-Justin J. - Quantum field theory and critical phenomena | 31 |
Evans L.C. - Partial Differential Equations | 636 |
Wall H.S. - Analytic Theory of Continued Fractions | 215 |
Allen R.L., Mills D.W. - Signal analysis. Time, frequency, scale and structure | 150, 158-168 |
Lipschutz Seymour - Schaum's Outline of Theory and Problems of Linear Algebra (Schaum's Outlines) | 205 |
Gustafsson F. - Adaptive filtering and change detection | 453 |
Streater R.S., Wightman A.S. - PCT, Spin and Statistics, and All That | 84-93 |
Heyde C.C. - Quasi-likelihood and its application: a general approach to optimal parameter estimation | 13, 44 |
Lee J.M. - Differential and Physical Geometry | 15, 618 |
Seebach J.A., Steen L.A. - Counterexamples in Topology | 64 |
Swanson D.G., Hoefer W.J.R. - Microwave Circuit Modeling Using Electromagnetic Field Simulation | 38n, 48 |
Majid S. - Foundations of Quantum Group Theory | 30, 76, 151, 194, 207, 217-219, 244 |
Kuttler K. - Introduction to linear algebra for mathematicians | 237 |
Handscomb D.C. - Methods of numerical approximation | 177 |
Roberts A.W., Varberg D.E. - Convex Functions | 51 |
Henrici P. - Applied and Computational Complex Analysis (Vol. 3) | 533, 534, 538, 539, 548, 549, 569 |
Hewitt E., Ross K.A. - Abstract Harmonic Analysis (Vol. 1) | 464 |
Rudin W. - Real and Complex Analysis | 76, 332 |
de Branges L., Rovnyak J. - Square summable power series | 8 |
Porter D., Stirling D.S.G. - Integral equations: a practical treatment, from spectral theory to applications | 352 |
O'Malley R.E. - Introduction to Singular Perturbations | 60 |
Matousek J. - Lectures on Discrete Geometry (some chapters) | 333 |
Wayne C.E. - Seminar on Hamilton PDE | 40 |
Hochstadt H. - Integral Equations (Pure & Applied Mathematics Monograph) | 12ff |
Springer G. - Introduction to Riemann Surfaces | 178 |
Hewitt E., Ross K.A. - Abstract Harmonic Analysis (Vol. 2) | 464 I |
Ward R.S., Wells R.O. - Twistor geometry and field theory | 19, 263 |
Lauwerier H.A. - Calculus of variations in mathematical physics | 44-48 |
Benson D. - Mathematics and music | 399 |
Parr R., Yang W. - Density-functional theory of atoms and molecules | 20, 46, 259 |
Topiwala P.N. - Wavelet Image and Video Compression | 20 |
Helgaker T., Jorgensen P., Olsen J. - Molecular Electronic-Structure Theory. Part 2 | 202 |
Opechowski W. - Crystallographic and metacrystallographic groups | N21.2 |
Folland J.B. - Real Analysis: Modern Techniques and Their Applications | 172 |
Douglas R.G. - Banach algebra techniques in operator theory | 63-80, 66 |
Loeve M. - Probability Theory (part 2) | 80 |
Mukamel S. - Principles of Nonlinear Optical Spectroscopy | 76, 116, 117, 147 |
Debnath L. - Nonlinear water waves | 199, 464 |
Birman M.S., Solomyak M.Z. - Spectral Theory of Self-Adjoint Operators in Hilbert Space | 19 |
Bochner S., Chandrasekharan K. - Fourier Transforms | p.104 |
Adams R.A. - Sobolev Spaces | 5 |
Heikkila S., Lakshmikantham V. - Monotone Iterative Techniques for Discontinuous Nonlinear Differential Equations | 458 |
Curtain R.F., Pritchard A.J. - Functional Analysis in Modern Applied Mathematics | 56 |
Debnath L., Mikusinski P. - Introduction to Hilbert Spaces with Applications | 93 |
Debnath L. - Nonlinear Partial Differential Equations for Scientists and Engineers | 366, 392-394 |
Behnke H., Bachmann F., Fladt K. - Fundamentals of Mathematics, Volume III: Analysis | 393, 394, 399, 400, 401, 405, 412, 515, 516 |
Behnke H., Bachmann F., Fladt K. - Fundamentals of Mathematics, Volume II: Geometry | 656 |
Bergman S., Schiffer M. - Kernel Functions and Elliptic Differential Equations in Mathematical Physics | 116, 240, 322 |
Kythe P.K., Schaferkotter M.R. - Partial Differential Equations and Mathematica | 109, 218 |
Lam Y. - Geometric Process and Its Applications | 64 |
Sepanski R.M. - Compact Lie Groups | 55 |
Gierz G., Hofmann K.H., Keimel K. - Continuous Lattices and Domains | 15 O-2.7(8) |
Bogachev V.I. - Measure Theory Vol.1 | 255 |
Mill J.V. - The Infinite-Dimensional Topology of Function Spaces | 8, 9, 20, 21, 197, 437, 579, 588, 589 |
Ruppert W. - Compact Semitopological Semigroups: An Intrinsic Theory | 166 |
Reich S., Shokhet D. - Nonlinear Semigroups, Fixed Points, and Geometry of Domains in Banach Spaces | 15 |
Borwein P, Erdelyi T - Polynomials and polynomial inequalities | 42 |
Monk P. - Finite Element Methods for Maxwell's Equations | 16 |
Borwein P., Choi S., Rooney B. - The Riemann Hypothesis | 116 |
Sagan H. - Advanced Calculus of Real-Valued Functions of a Real Variable and Vector-Valued Functions of a Vector Variable | 589 |
Polyanin A., Manzhirov A.V. - Handbook of Mathematics for Engineers and Scientists | 196 |
Serre D. - Handbook of Mathematical Fluid Dynamics, Vol. 1 | 21, 22 |
Lam T.Y. - A first course in noncommutative ring theory | 174 |
Debnath L. - Linear Partial Differential Equations for Scientists and Engineers | 629 |
Cappe O., Ryden T., Moulines E. - Inference in Hidden Markov Models | 612 |
Young R.M. - An Introduction to Non-Harmonic Fourier Series, Revised Edition | 6, 206 |
Resnick S.I. - A probability path | 181, 334 |
Hansen G.A., Zardecki A., Douglass R.A. - Mesh Enhancement: Selected Elliptic Methods, Foundations and Applications | 114 |
Araki H. - Mathematical Theory of Quantum Fields | 193 |
Hensley D. - Continued Fractions | 168, 181, 189 |
Gohberg I., Goldberg S. - Basic Operator Theory | 9 |
Cao Z.-Q., Kim K.H., Roush F.W. - Incline algebra and applications | 103 |
Krantz S.G. - Function Theory of Several Complex Variables | 50, 176 |
Loeve M. - Probability Theory (part 1) | 80 |
Ash R.B. - Information theory | 250, 262 ff. |
Yandell B. - The Honors Class: Hilbert's Problems and Their Solvers | 4, 17, 149-150, 160 |
Dugunji J. - Topology | 192 |
Reed M., Simon B. - Methods of Modern mathematical physics (vol. 3) Scattering theory | 36 |
Neittaanmaki P., Tiba D. - Optimal Control of Nonlinear Parabolic Systems: Theory, Algorithms and Applications | 31 |
Greiner W. - Quantum mechanics. An introduction | 42, 88, 423 |
Oksendal B. - Stochastic Differential Equations: An Introduction With Applications | 9 |
Sahoo P.K., Riedel T. - Mean Value Theorems and Functional Equations | 180 |
Rachev S.T. - Probability Metrics and the Stability of Stochastic Models | 372 |
Berberian S.K. - Fundamentals of Real Analysis | 345 |
Choquet-Bruhat Y., Dewitt-Morette C., Dillard-Bleick M. - Analysis, manifolds and physics (vol. 1) | 30 |
Thaller B. - Visual quantum mechanics | 17, 21-25 |
Shankar R. - Basic Training In Mathematics | 278 |
Goldberg M.A. (ed.) - Solution Methods for Integral Equations | 68, 116-118, 124, 128, 184, 326 |
Kline M. - Mathematical Thought from Ancient to Modern Times, Vol. 1 | 1074, 1082, 1088, 1091-1095, 1159 |
Rockmore D. - Stalking the Riemann Hypothesis: The Quest to Find the Hidden Law of Prime Numbers | 171-172, 179, 218 |
Jost J., Simha R.T. - Compact Riemann Surfaces: An Introduction to Contemporary Mathematics | 81, 94, 104, 198 |
Geroch R. - Mathematical physics | 277 |
Reed M., Simon B. - Methods of Functional Analysis (in 4 volumes). Volume 1: Functional Analysis | 39 |
Suykens J.A.K., Horvath G., Basu S. - Advances in learning theory: methods, models and applications | 30 |
Atkinson K.E., Han W. - Theoretical Numerical Analysis: A Functional Analysis Framework | 26 |
Sandor J., Mitrinovic D.S., Crstici B. - Handbook of Number Theory II | 185 |
Balescu R. - Equilibrium and nonequilibrium statistical mechanics | 13, 444 |
Delves L.M. (ed.), Walsh J. (ed.) - Numerical Solution of Integral Equations | 46-49, 108, 116, 217, 293, 321 |
Royden H.L. - Real Analysis | 210 |
Reed M., Simon B. - Methods of Modern mathematical physics (vol. 4) Analysis of operators | $36^1$ |
Zagoskin A.M. - Quantum theory of many-body systems | 33 |
Eschrig H. - The Fundamentals of Density Functional Theory | 13, 116 |
Domb C., Green M.S. (eds.) - Phase Transitions and Critical Phenomena (Vol. 1) | 115, 117, 129, 139, 141, 142, 143, 144, 165 |
Glasko V. - Inverse Problems of Mathematical Physics | 63-65 |
Rudin W. - Functional analysis | 293 |
Intriligator M.D., Arrow K.J. - Handbook of Mathematical Economics (vol. 4) | 1623, 1635, 1637, 1672 |
Rall D. - Computational Solution to Nonlinear Operator Equations | 22, 26 |
Antman S.S. - Nonlinear Problems of Elasticity | 667 |
Dorlas T.C. - Statistical mechanics, fundamentals and model solutions | 240 |
Griffits D.J. - Introduction to quantum mechanics | 100-101 |
Eidelman Y., Milman V., Tsolomitis A. - Functional Analysis. An Introduction | 33 |
Royden H.L. - Real Analysis | 210 |
Szekeres P. - A Course in Modern Mathematical Physics: Groups, Hilbert Space and Differential Geometry | 330-334 |
Kline M. - Mathematical Thought from Ancient to Modern Times, Vol. 3 | 1074, 1082, 1088, 1091-1095, 1159 |
Lang S. - Real Analysis | 159 |
Galindo A., Pascual P. - Quantum Mechanics Two | I 37, 39, 347 |
Polkinghorne J.C. - The quantum world | 23, 94 |
Dirac P.A.M. - The Principles of Quantum Mechanics | 40 |
Katayama T., Sugimoto S. - Statistical Methods in Control and Signal Processing | 9 |
Mukamel S. - Principles of nonlinear spectroscopy | 76, 116, 117, 147 |
Taylor J.C. - An Introduction to Measure and Probability | 154, 216 |
Kakosyan A.V., Klebanov L.B., Melamed J.A. - Characterization of Distributions by the Method of Intensively Monotone Operators | 133 |
Shiryaev A.N. - Probability | 262 |
Jahne B. - Digital Image Processing | 62 |
Schroeder M.R. - Schroeder, Self Similarity: Chaos, Fractals, Power Laws | 113 |
Braunstein S.L. - Quantum computing | 6, 16, 101, 119, 212, 122, 128, 153, 154, 155, 167, 184, 205, 206, 216, 226, 229, 230, 231, 235, 244, 253, 254, 261, 262, 273, 282 |
Rudin W. - Real and complex analysis | 77 |
Kuznetsov N., Mazya V., Vainberq B. - Linear Water Waves: A Mathematical Approach | 446, 486, 489 |
Kress R., Gehring F.W. - Numerical Analysis | 40 |
Dieudonne J. - Foundation of Modern Analysis | 6.2 |
Gruenberg K.W. - Linear Geometry | 146 |
Duffie D. - Security Markets. Stochastic Models | 63 |
Gallier J. - Geometric Methods and Applications: For Computer Science and Engineering | ix, 173, 295 |
Yam T.Y. - Lectures on Modules and Rings | 261, 265 |
Kythe P.K. - Fundamental Solutions for Differential Operators and Applications | 2 |
Halmos P.R. - Finite-Dimensional Vector Spaces | 189 |
Blyth T.S., Robertson E.F. - Further Linear Algebra | 14 |
Bachman G., Beckenstein E. - Fourier And Wavelet Analysis | 5, 61 |
Stakgold I. - Green's Functions and Boundary Value Problems | 263 |
Nagaosa N. - Quantum field theory in condensed matter physics | 2 |
Kline M. - Mathematical Thought from Ancient to Modern Times, Vol. 2 | 1074, 1082, 1088, 1091-1095, 1159 |
Simon B. - Representations of Finite and Compact Groups | 22 |
Aubin T. - Nonlinear Analysis on Manifolds: Monge-Ampere Equations | 70 |
Kadison R.V., Ringrose J.R. - Fundamentals of the Theory of Operator Algebras (vol. 2) Advanced Theory | 79 |
Weir A.J. - Lebesgue Integration and Measure | 221-222 |
Bogachev V.I. - Measure Theory Vol.2 | I: 255 |
Strichartz R.S. - The way of analysis | 355, 377, 673 |
Lebowitz J.L., Montroll E.W. - Nonequilibrium phenomena I. The boltzmann equation | 60, 68, 72 |
Bao G., Cowsar L., Masters W. - Mathematical Modeling in Optical Science | 278, 290 |
Schechter M. - Spectra of partial differential operators | 4 |
Strang G. - Linear Algebra and Its Applications | 177 |
Lopuzanski J. - An introduction to symmetry and supersymmetry in quantum field theory | 19, 21, 23, 24, 28, 30, 31, 33, 36, 37, 39, 66, 165 |
Köthe G. - Topological vector spaces I | 23 |
Bellman R.E. - Introduction to the mathematical theory of control processes (Volume I: Linear Equations and Quadratic Criteria) | 218, 240 |
Hannan E. J. - Multiple time series | 497-505 |
Hughston L.P., Tod K.P., Bruce J.W. - An Introduction to General Relativity | 149 |
Dirac P.A.M. - The Principles of Quantum Mechanics, Vol. 27 | 40 |
Kirillov A.A. - Elements of the Theory of Representations | 37 |
Galindo A., Pascual P. - Quantum Mechanics One | 37, 39, 347 |
Rockmore D. - Stalking the Riemann Hypothesis | 171-172, 179, 218 |
Allaire G. - Numerical Analysis and Optimization: An Introduction to Mathematical Modelling and Numerical Simulation | 399 |
Lee T.D. - Practicle physics and introduction to field theory | 14, 25, 37 |
Graham C.C., McGehee O.C. - Essays in Commutative Harmonic Analysis | 4 |
Radjavi H., Rosenthal P. - Simultaneous Triangularization | 142 |
Hu S.-T. - Elements of real analysis | 207, 260 |
Berinde V. - Iterative Approximation of Fixed Points | 12, 63, 69, 70, 73, 78, 114, 137, 140, 143, 145, 148, 155, 160, 188, 202, 207 |
Young R.M. - An Introduction to Nonharmonic Fourier Series | 6, 206 |
Cercignani C. - Theory and Application of the Boltzman Equation | 120, 128, 187, 212, 213, 320, 394, 403 |
Tarantola A. - Inverse problem theory and methods for model parameter estimation | 117, 190, 241 |
Mix D.F., Olejniczak K.J. - Elements of Wavelets for Engineers and Scientists | 25 |
Elze H.-T. (ed.) - Decoherence and entropy in complex systems | 63, 120, 131, 158, 205, 218, 240, 391 |