Книга | Страницы для поиска |
Weintraub S. - Differential Forms. A complement to vector calculus | |
Guillemin V., Pollack A. - Differential topology | 169, 172 |
Nevanlinna R., Paatero V. - Introduction to Complex Analysis | 108-113 |
Rudin W. - Principles of Mathematical Analysis | 255 |
Keisler H.J. - Elementary calculus | 795 |
Morse P., Feshbach H. - Methods of Theoretical Physics (part 1) | 17 (see also 'Integration in complex plane') |
Morse P., Feshbach H. - Methods of Theoretical Physics (part 2) | 17 (see also 'Integration in complex plane') |
Borisenko A.I., Tarapov I.E. - Vector and Tensor Analysis with Applications | 136 |
Mauch S. - Introduction to Methods of Applied Mathematics or Advanced Mathematical Methods for Scientists and Engineers | 280 |
Silverman J.H. - The arithmetic of elliptic curves | 146, 147; see also Elliptic integral |
Conway J.B. - Functions of One Complex Variable | 63 |
Lee J.M. - Introduction to Smooth Manifolds | 78, 79 |
Millman R.S., Parker G.D. - Elements of Differential Geometry | 50 |
Widder D.V. - Advanced calculus | see Integral |
Weinstock R. - Calculus of variations with applications to physics & engineering | 6, 7 |
Smirnov V.I. - Higher mathematics. Vol.2 | 205-210 |
Ahlfors L.V. - Complex analysis | 101-109 |
Williamson R.E., Crowell R.H., Trotter H.F. - Calculus of vector functions | 130 |
Polya G., Latta G. - Complex Variables | 147 |
Sagan H. - Advanced Calculus of Real-Valued Functions of a Real Variable and Vector-Valued Functions of a Vector Variable | 526 |
Coffin D. - Calculus on the HP-48G/GX | 271-274, 276-277 |
Ablowitz M.J., Fokas A.S. - Complex Variables: Introduction and Applications | 72, 74 |
Weatherburn C. - Advanced Vector Analysis | 13, 86 |
Boothby W.M. - An introduction to differentiable manifolds and riemannian geometry | 264 |
Shankar R. - Basic Training In Mathematics | 159 |
Greiner W. - Classical mechanics. Point particles and relativity | 109 |
Schey H.M. - DIV, Grad, Curl, and All That: An Informal Text on Vector Calculus | 63-72 |
Ayres F.J., Mendelson E. - Schaum's Outline of Calculus | 427 |
Menzel D.H. - Mathematical Physics | 35 |
Perry J. - The Calculus for Engineers | 69, 134 |
Schercliff J.A. - Vector Fields | 33, 62, 88, 95, 130, 272 |
Greenberg M.D. - Advanced engineering mathematics | 718 |
Feynman R.P., Leighton R.B., Sands M. - The Feynman lectures on physics (vol.2) | II-3-1 |
Dubrovin B.A., Fomenko A.T. - Modern Geometry - Methods and Applications: The Geometry of Surfaces, Transformation Groups and Fields | 251, 256 |
Spivak M. - A Comprehensive Introduction to Differential Geometry (Vol.1) | 239, 243 |
Munkres J.R. - Analysis on manifolds | 278 |
Nayfeh M.H., Brussel M.K. - Electricity and Magnetism | 19 |
Kleppner D., Kolenkow R. - An introduction to mechanics | 159, 166 |
Sattinger D.H., Weaver O.L. - Lie groups and algebras with applications to physics, geometry, and mechanics | 62 |
Bak J., Newman D.J. - Complex Analysis | 44 |
Kenzel W., Reents G., Clajus M. - Physics by Computer | 36 |
Fine B., Rosenberger G. - Fundamental Theorem of Algebra | 52-61 |
Asmar N.H. - Partial Differential Equations with fourier series and boundary value problems | 643 |
Pipes L.A. - Applied Mathemattics for Engineers and Physicists | 347 |
Kuttler K. - Calculus, Applications and Theory | 373 |
Olver P.J., Shakiban C. - Applied linear. algebra | 125 |
Clemens C.H. - Scrapbook of Complex Curve Theory | 56 |
Kreyszig E. - Advanced engineering mathematics | 421, 633 |
Neff H.P.Jr. - Introductory electromagnetics | 9 |
Houston W.V. - Principles of Mathematical Physics | 88 |
Boothby W.M. - An Introduction to Differentiable Manifolds and Riemannian Geometry | 264 |
Arya A.P. - Introduction to Classical Mechanics | 161 |
Kaplan W. - Introduction to analytic functions | 29 |
Huggins E.R. - Physics 2000 | (see Integral, line) |
Harman T.L., Dabney J.B., Richert N.J. - Advanced Engineering Mathematicas with MATLAB | 670 |
Nehari Z. - Conformal mapping | 6 |
Papoulis A. - The Fourier Integral and Its Applications | 290 |
Shorter L.R. - Problems And Worked Solutions In Vector Analysis | 296 |
Morse P.M. - Methods of theoretical physics | 17 (see also Integration in complex plane) |
Richards P.I. - Manual of Mathematical Physics | 296 |
Lane S.M. - Mathematics, form and function | 173 |
Hobbie R., Roth B. - Intermediate Physics for Medicine and Biology, | 142 |
Hildebrand F.B. - Advanced Calculus for Applications | 281, 523 |
Griffits D.J. - Introductions to electrodynamics | 24 |
Strang G. - Introduction to Applied Mathematics | 199, 364 |
Blum E.K., Lototsky S.V. - Mathematics of Physics and Engineering | 131 |
Anderson J.L. - Principles of Relativity Physics | 29 |
Hassani S. - Mathematical Methods: for Students of Physics and Related Fields | 387-391 |
Vaisala J. - Lectures On N-Dimensional Quasiconformal Mappings | 8 |
Spivak M. - Calculus on Manifolds: A Modern Approach to Classical Theorems of Advanced Calculus | 101 |
Murty R., Murty K. - Non-vanishing of L-Functions and Applications (Progress in Mathematics) | 6 |
Greub W., Halperin S., Vanstone R. - Connections, curvature, and cohomology. Volume 1 | 234 |
Heinonen J. - Lectures on Analysis on Metric Spaces | 50 |
Owen D. - A First Course in the Mathematical Foundations of Thermodynamics (Undergraduate Texts in Mathematics) | 4, 34, 35, 46, 63 |
Feynman R., Leighton R., Sands M. - Lectures on Physics 2 | II-3-1 |