| Книга | Страницы для поиска |
| Guillemin V., Pollack A. - Differential topology | 40 |
| Taylor M.E. - Partial Differential Equations. Basic theory (vol. 1) | 329 |
| Hunter J.K., Nachtergaele B. - Applied Analysis | 381 |
| Falconer K. - Fractal Geometry. Mathematical Foundations and applications | 70, 73 |
| Zeidler E. - Nonlinear Functional Analysis and its Applications IV: Applications to Mathematical Physic | 552 |
| Oksendal B. - Stochastic differential equations : an introduction with applications | 172-174, 188 |
| Falconer K. - Fractal Geometry: Mathematical Foundations and Applications | 78 |
| Hayek S.I. - Advanced mathematical methods in science and engineering | 23, 559 |
| Meirovitch L. - Methods of analytical dynamics | 174, 179 |
| Olver P.J. - Equivalence, Invariants and Symmetry | 19, 455 |
| Lee J.M. - Differential and Physical Geometry | 235 |
| Latrve D.R., Kreider D.L., Proctor T.G. - Hp-48G/Gx Investigations in Mathematics | 320, 321 |
| Miranker W.L. - Numerical Methods for Stiff Equations and Singular Perturbation Problems | 176 |
| Rudin W. - Real and Complex Analysis | 312 |
| De Branges L. - Hilbert Spaces of Entire Functions | 136, 315 |
| Lee J.M. - Introduction to Smooth Manifolds | 113 |
| Schneider R. - Convex Bodies: The Brunn-Minkowski Theory | 73 |
| Newstead P.E. - Introduction to modulu problems and orbit spaces | 66 |
| Mimura M., Toda H. - Topology of Lie Groups, I and II | 310, 337 |
| Bachman G. - Introduction to p-Adic Numbers and Valuation Theory | 113 |
| Akhiezer N.I., Glazman I.M. - Theory of Linear Operators in Hilbert Space | 46 |
| Birman M.S., Solomyak M.Z. - Spectral Theory of Self-Adjoint Operators in Hilbert Space | 83 |
| Curtain R.F., Pritchard A.J. - Functional Analysis in Modern Applied Mathematics | 261 |
| Behnke H., Bachmann F., Fladt K. - Fundamentals of Mathematics, Volume II: Geometry | 333-334 |
| Hancock H. - Theory of Maxima and Minima | 177 |
| Brieskorn E., Knorrer H. - Plane Algebraic Curves | I 213, 363 |
| Hogben L. - Handbook of Linear Algebra | 24-8 |
| Polyanin A., Manzhirov A.V. - Handbook of Mathematics for Engineers and Scientists | 367, 379, 387 |
| Milnor J.W. - Topology from the Differentiable Viewpoint | 7 |
| Valls C., Barreira L. - Stability of Nonautonomous Differential Equations | 246 |
| Terng Ch. - Critical Point Theory and Submanifold Geometry | 76, 182 |
| Fleming W.H., Soner H.M. - Controlled Markov Processes and Viscosity Solutions | 42 |
| Gohberg I., Goldberg S. - Basic Operator Theory | 226 |
| Chung K.L., Walsh J.B. - Markov Processes, Brownian Motion, and Time Symmetry | 97 |
| Oksendal B. - Stochastic Differential Equations: An Introduction With Applications | 183-185, 199 |
| Lieberman G.M. - Second Order Parabolic Differential Equations | 38-41 |
| Akivis M., Goldberg V. - Differential Geometry of Varieties with Degenerate Gauss Maps | 50, 63, 92, 93, 99, 151 |
| Shiryaev A., Peskir G. - Optimal Stopping and Free-Boundary Problems | 152, 156 |
| Lukes J., Maly J., Zajicek L. - Fine Topology Methods in Real Analysis and Potential Theory | 3, 397 , 392, 399 |
| Cohn P.M. - Algebraic numbers and algebraic functions | 111 |
| Eidelman Y., Milman V., Tsolomitis A. - Functional Analysis. An Introduction | 75, 173 |
| Lang S. - Real Analysis | 518 |
| Fukushima M. - Dirichlet forms and markov process | 93 |
| Chipot M., Quittner P. - Stationary Partial Differential Equations, Vol. 1 | 707 |
| Rudin W. - Real and complex analysis | 319 |
| Golubitsky M., Guillemin V. - Stable Mappings and Their Singularities | 34 |
| Stahl H., Totik V. - General Orthogonal Polynomials | 229 |
| Gallier J. - Geometric Methods and Applications: For Computer Science and Engineering | 421 |
| Kozlov V., Mazya V., Rossmann J. - Spectral problems associated with corner singularities of solutions to elliptic equations | 10 |
| Pap E. - Complex Analysis Through Examples And Exercises | 227 |
| Havin V.P., Nikolski N.K. (eds.) - Linear and Complex Analysis Problem Book 3 (part 2) | 12.30, S.16.22 |
| Morimoto M. - Introduction to Sato's hyperfunctions | 113 |
| Matsusaka T. - Theory of Q-varietties | II, � 1, 19 |
| Bak J., Newman D.J. - Complex Analysis | 229 |
| Blumenthal R.M. - Excursions of markov processes | 31 |
| Silverman J.H. - Advanced Topics in the Arithmetic of Elliptic Curves | 302 |
| Reed M., Simon B. - Methods of Modern mathematical physics (vol. 2) Fourier analysis, self-adjointness | 88 |
| Wen-Tsun W. - Mathematics Mechanization | c8s8. 4 |
| Bhaya A., Kaszkurewicz E. - Control Perspectives on Numerical Algorithms and Matrix Problems | 32 |
| Bertsekas D.P. - Constrained Optimization and Lagrange Multiplier Methods | 67 |
| Anderson G.A., Granas A. - Fixed Point Theory | 367, 551 |
| Knopp K. - Theory of Functions. Part Two | 93 |
| Lang S. - Real and Functional Analysis (Graduate Texts in Mathematics Series #142) | 562 |
| Attouch H., Buttazzo G., Michaille G. - Variational Analysis in Sobolev and BV Spaces: Applications to PDEs and Optimization | 393 |
| Haller G. - Chaos Near Resonance | 377 |
| M.A.Akivis, V.V.Goldberg - Projective Differential Geometry of Submanifolds | 7, 118 |
| Vogel C.R. - Computational Methods for Inverse Problems (Frontiers in Applied Mathematics) | 155 |
| Lee J.M. - Differential and physical geometry | 235 |
| Alekseevskij D.V., Vinogradov A.M., Lychagin V.V. - Geometry I: Basic Ideas and Concepts of Differential Geometry | 125, 130, 144 |
| Novikov S.P., Fomenko A.T. - Basic elements of differential geometry and topology | 62, 288 |
| Cohn P.M. - Algebraic Numbers and Algebraic Functions | 111 |
| Valentine F.A. - Convex Sets | 83 |
| Flatto L. - Poncelet's Theorem | 76 |
| Dienes P. - The Taylor series: An introduction to the theory of functions of a complex variable | 230, 241 |
| IItaka S. - Algebraic Geometry: An Introduction to Birational Geometry of Algebraic Varieties | 120 |
| Audin M. - Geometry | 258, 273 |
| Audin M. - Geometry | 258, 273 |
| Knopp K. - Theory of functions | 93 |
| Gelbaum B.R. - Problems in Real and Complex Analysis | 11.1. 115 |
| Zuo K. - Representations Of Fundamental Groups Of Algebraic Varieties | 60 |
| Aulbach B. - Continuous and Discrete Dynamics Near Manifolds of Equilibria | 53, 93 |
| Adams D.R., Hedberg L.I. - Function spaces and potential theory | 164, 181 |
| Rudin W. - Function theory in polydiscs | 97 |
| Bachman G. - Elements of Abstract Harmonic Analysis | 37 |
| Hirsch M.W., Smale S. - Differential Equations, Dynamical Systems, and Linear Algebra | 200 |
| Chung K.L., Walsh J.B - Markov Processes, Brownian Motion, and Time Symmetry | 97 |
| Michel Boileau, Sylvain Maillot, Joan Porti - Three-dimensional orbifolds and their geometric structure | 20 |
| Zeidler E. - Oxford User's Guide to Mathematics | 800 |
| Kozlov V., Mazya V., Rossmann J. - Elliptic boundary value problems in domains with point singularities | 146 |
| Arnold V.I. - Ordinary Differential Equations | 264 |
| Pier J.-P. - Mathematical Analysis during the 20th Century | 290 |
| Vidyasagar M. - Nonlinear systems analysis | 395 |
| Margalef-Roig J., Outerelo Dominguez E. - Differential topology | 362 |
| Fritzsche K., Grauert H. - From Holomorphic Functions To Complex Manifolds | 39, 140, 161 |
| Snygg J. - Clifford algebra: a computational tool for physicists | 70 |
| Blumenthal R.K., Getoor R.M. - Markov processes and potential theory | 61, 199 |
| Greub W., Halperin S., Vanstone R. - Connections, curvature, and cohomology. Volume 1 | 136 |
| Fayolle G., Iasnogorodski R., Malyshev V. - Random Walks in the Quarter-Plane: Algebraic Methods, Boundary Value Problems and Applications (Stochastic Modelling and Applied Probability) | 8 |
| Ivanov O.A. - Easy as Pi?: An Introduction to Higher Mathematics | 144 |
| Lord E., Wilson C. - The Mathematical Description of Shape and Form (Mathematics and Its Applications) | 74, 90 |
| Snygg J. - Clifford algebra: a computational tool for physicists | 70 |
| Falconer K. - Fractal geometry: mathematical foundations and applications | 78 |
| Arkhipov G.I., Chubarikov V.N., Karatsuba A.A. - Trigonometric Sums in Number Theory and Analysis | 133 |
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