Книга | Страницы для поиска |
Kogut J.B., Stephanov M.A. - The Phases of Quantum Chromodynamics: From Confinement to Extreme Environments | |
Немнюгин М.А., Стесик О.Л. - Современный фортран. Самоучитель | 207 |
Гамма Э., Хелм Р., Джонсон Р. - Приемы объектно-ориентированного проектирования. Паттерны проектирования | 227 |
Веверка П., Тейлор М. - ICQ 2000 для "чайников" | 104 |
Пономаренко С.И. - Adobe Illustrator CS. Наиболее полное руководство | см. 'Макрокоманда' |
Сахлин Д. - Adobe Acrobat 6 | 62 |
Hunter J.K., Nachtergaele B. - Applied Analysis | 419 |
Khosrowpour M. - Encyclopedia Of Information Science And Technology | 572, 2881 |
Misner C.W., Thorne K.S., Wheeler J.A. - Gravitation | see 'Dynamical path length' |
Ito K. - Encyclopedic Dictionary of Mathematics. Vol. 2 | 431.A |
Zeidler E. - Nonlinear Functional Analysis and its Applications IV: Applications to Mathematical Physic | 81, 884 |
Chopra V., Eaves J., Jones R. - Beginning JavaServer Pages | See also Specific action |
Walrath K., Campione M., Huml A. - JFC Swing Tutorial, The: A Guide to Constructing GUIs | 2nd 3rd 4th 5th |
Hamilton W.R. - The collected mathematical papers. Volume 1: geometrical optics | See also V |
Hamilton W.R. - The collected mathematical papers. Volume 2: dynamics | 25, 107, 214. See also Characteristic function |
Baker A. - Algebra and Number Theory | 30 |
Cox D., Katz S. - Mirror symmetry and algebraic geometry | 412, 416 |
McGregor J.D., Sykes D.A. - A Practical Guide to Testing Object-Oriented Software | |
Majid S. - Foundations of Quantum Group Theory | 2, 16-22, 216, 494 |
Hinch E.J. - Perturbation Methods | 129 |
Winograd T. - Understanding computers and cognition | 71-72 |
Weinstock R. - Calculus of variations with applications to physics & engineering | 85-88, 268-269 |
Deitel H.M. - Visual C# How to Program | 2nd 3rd |
Holzner S. - Spring Into PHP 5 | 2nd |
Bragg R. - Windows Server 2003 Security: A Technical Reference | |
Goldstein H., Poole C., Safko J. - Classical mechanics | 356 |
Maier R. - Knowledge Management Systems: Information and Communication Technologies for Knowledge Management | 254, 256 |
Atkins P.W., Friedman R.S. - Molecular Quantum Mechanics | 38, 513 |
Rotman J.J. - An Introduction to the Theory of Groups | 55 |
Liddle A., Lyth D.H. - Cosmological Inflation and Large-Scale Structure | 164 |
Wilensky R. - Planning and Understanding | 21, 137-138 |
Swart B., Cashman M., Gustavson P. - C++ Builder Developer's Guide | |
Deitel H.M. - C++ How to Program | 2nd 3rd 4th 5th 6th 7th |
Lippman S.B., Lajoie J., Moo B.E. - C++ Primer | |
Debnath L., Mikusinski P. - Introduction to Hilbert Spaces with Applications | 367 |
Maugin G.A. - Material inhomogeneities in elasticity | 3 |
Straubing H. - Finite automata, format logic, and circuit complexity | 61 |
Ryder L.H. - Quantum Field Theory | 160 |
Lawvere F.W., Rosebrugh R. - Sets for Mathematics | 76, 171ff |
Grillet P.A. - Abstract Algebra | See also group action |
Sepanski R.M. - Compact Lie Groups | 9 |
Street R., Murray M. (Ed), Broadbridge Ph. (Ed) - Quantum Groups: A Path to Current Algebra | 59, 101, 111 |
Godsil C., Royle G. - Algebraic Graph Theory | 19 |
Eisenbud D. - Computations in Algebraic Geometry with Macaulay 2 | 289, 293 |
Strauss W.A. - Partial Differential Equations: An Introduction | 375 |
Sketches - A supplement for Category theory for computing science | 45 |
Ericson T. - Codes on Euclidean Spheres | 205 |
Bridges Th.J., Furter J.E. - Singularity Theory and Equivariant Symplectic Maps | 11. |
Gershenfeld N. - The Nature of Mathematical Modelling-Neil Gershenfeld | 38 |
Reed M., Simon B. - Methods of Modern mathematical physics (vol. 3) Scattering theory | 279 |
Blyth T.S., Robertson E.F. - Basic Linear Algebra | 70 |
Thaller B. - Visual quantum mechanics | 51 |
Aitchison I.J.R., Hey A.J.G. - Gauge theories in particle physics. Volume 1: from relativistic quantum mechanics to QED | 120 |
Shankar R. - Basic Training In Mathematics | 309 |
James G., Liebeck M.W. - Representations and Characters of Groups | 337 |
Duistermaat J.J., Kolk J.A.C. - Multidimensional Real Analysis II: Integration | 238,366 |
Duistermaat J.J., Kolk J.A.C. - Multidimensional Real Analysis I(Cambridge Studies in Advanced Mathematics #86), Vol. 1 | 238, 366 |
Gudder S.P. - Stochastic methods in quantum mechanics | 169 |
Hein J.L. - Discrete Mathematics | 554 |
Heusler M., Goddard P. - Black Hole Uniqueness Theorems | see Lagrangian |
Mensky M.B. - Continuous quantum measurements and path integrals | 37 |
Thouless D.J. - Topological quantum numbers in nonrelativistic physics | 16.17, 32 |
Rowe N.C. - Artifical intelligence through Prolog | see Operator |
Zagoskin A.M. - Quantum theory of many-body systems | 13 ff. |
Eschrig H. - The Fundamentals of Density Functional Theory | 164, 167, 168 |
Pokorski S. - Gauge field theories | 12 |
White D.J. - Markov Decision Processes | 34, 117 |
Kadanoff L.P. - Statistical physics | 6, 24, 47, 262 |
Rammer J. - Quantum transport theory | 7 |
Lang S. - Undergraduate Algebra | 73 |
Szekeres P. - A Course in Modern Mathematical Physics: Groups, Hilbert Space and Differential Geometry | 465, 554 |
Cantwell B.J., Crighton D.G. (Ed), Ablowitz M.J. (Ed) - Introduction to Symmetry Analysis | 99, 105 |
Gitman D.M., Tyutin I.V. - Quantization of Fields with Constraints | 5, 171 |
McDuff D., Salamon D. - Introduction to Symplectic Topology | 12, 16-17, 280 |
Ito K. - Encyclopedic Dictionary of Mathematics | 431.A |
Galindo A., Pascual P. - Quantum Mechanics Two | I 123 |
Meester R., Roy R. - Continuum percolation | 23, 24 |
Polkinghorne J.C. - The quantum world | 42f, 92 |
Dirac P.A.M. - The Principles of Quantum Mechanics | 128 |
Du D. (ed.), Pardalos P. (ed.) - Handbook of combinatorial optimization: supplement volume A | 417, 594 |
Cohen A.M., Cuypers H., Sterk H. - Some tapas of computer algebra | 100, 185 |
Elizalde E., Odintsov A.D., Romeo A. - Zeta Regularization Techiques with Applications | 10 |
Lanzcos C. - The Variational Principles of Mechanics | 5 |
Konopinski E.J. - Electromagnetic fields and relativistic particles | see Variation principle |
Frampton P. - Dual Resonance Models and Superstrings | 219, 221, 401 |
Lawvere F.W., Schanuel S.H. - Conceptual Mathematics: A First Introduction to Categories | 218f, 303 |
Gallier J. - Geometric Methods and Applications: For Computer Science and Engineering | 12 |
Bleecker D. - Gauge Theory and Variational Principles | 55 |
Borel A. - Linear algebraic groups | AG.2.4 |
Thirring W.E. - Classical Mathematical Physics: Dynamical Systems and Field Theories | 100, 329 |
Simon B. - Representations of Finite and Compact Groups | 3 |
Hilborn R.C. - Chaos and nonlinear dynamics | 280-285, 491, 505-506 |
Thirring W.E. - Course in Mathematical Physics: Classical Dynamical System, Vol. 1 by Walter E. Thirring | 87 |
Eddington A.S. - Space Time and Gravitation | 147 |
Alagić S., Arbib M.A. - The Design of Well-Structured and Correct Programs | 5 |
Held A. (ed.) - General relativity and gravitation. 100 years after the birth of Albert Einstein (volume 1) | see also 'Lagrangian', 'Hamiltonian' |
Libai A., Simmonds J.G. - The Nonlinear Theory of Elastic Shells | 40 |
Hartle J.B. - Gravity: An Introduction to Einstein's General Relativity | see 'Newtonian mechanics' |
Dekker H. - Classical and quantum mechanics of the damped harmonic oscillator | 91-93, principal function |
Sanders J.A., Verhulst F. - Averaging methods in nonlinear dynamical systems | 144, 146, 147, 150, 162, 165, 204, 234 |
Atkinson D., Johnson P.W. - Exercises in Quantum Field Theory: A Self-Contained Book of Questions and Answers | 24 |
Fulling S. - Aspects of Quantum Field Theory in Curved Spacetime | 1, 68, 116-120, 126 |
Adair R.K. - The Great Design: Particles, Fields, and Creation | 29n, 164 |
Sagan B.E. - The Symmetric Group: Representations, Combinatorial Algorithms, and Symmetric Functions | 7 |
Касихин В.В. - Как стать создателем компьютерных игр. Краткое руководство | 35 |
Dubrovin B.A., Fomenko A.T. - Modern Geometry - Methods and Applications: The Geometry of Surfaces, Transformation Groups and Fields | 318 |
Allen H.S. - Electrons and Waves | 43, 45, 299 |
Held A. (ed.) - General Relativity and Gravitation: One Hundred Years After the Birth of Albert Einstein, Vol. 2 | see 'Lagrangian', 'Hamiltonian' |
Hein J.L. - Discrete Structures, Logic, and Computability | 548 |
Mercier A. - Analytical and canonical formalism in physics | 9, 11, 12, 62, 55, 59, 60, 69, 94 |
Dirac P.A.M. - The Principles of Quantum Mechanics, Vol. 27 | 128 |
Galindo A., Pascual P. - Quantum Mechanics One | 123 |
Logan J.D. - Invariant Variational Principles | 11 |
Sattinger D.H., Weaver O.L. - Lie groups and algebras with applications to physics, geometry, and mechanics | 69, 72 |
Hans-Jürgen Stöckmann - Quantum Chaos: An Introduction | 248, 264, 272-275, 282, 292, 297-301, 304 |
Planck M. - Theory of heat: Being volume V of "Introduction to theoretical physics" | 262 |
Berger M., Cole M. (translator) - Geometry I (Universitext) | see 'Group action' |
Taubner D. - Finite кepresentations of CCS and TCSP зrograms by фutomata and Petri Nets | 13 |
Lichtenberg A.J., Liebermen M.A. - Regular and Chaotic Dynamics | 171-172 |
Balian R. - From Microphysics to Macrophysics: Methods and Applications of Statistical Physics (vol. 1) | 81-82, 339 |
Tarantola A. - Inverse problem theory and methods for model parameter estimation | 189 |
Trappl R., Petta P. - Creating Personalities for Synthetic Actors | see also 'Human activity' |
Weinberg S. - The Quantum Theory of Fields. Vol. 1 Foundations | 299, 307 |
Deligne P., Kazhdan D., Etingof P. - Quantum fields and strings: A course for mathematicians (Vol. 1) | 7, 143, 729, 817, see also 'Lagrangian' |
Reed M., Simon B. - Methods of Modern mathematical physics (vol. 2) Fourier analysis, self-adjointness | 275 |
Junker G. - Supersymmetric Methods in Quantum and Statistical Physics | 68, 70 |
Ardema M.D. - Analytical Dynamics: Theory and Applications | 95 |
Schulman L.S. - Techniques and applications of path integration | 7 |
Kompaneyets A.S., Yankovsky G. - Theoretical Physics | 82 |
Kolb E.W., Turner M.S. - The Early Universe | 38-39, 47-48, 217-218, 277, 459, 479 |
Exner P. - Open quantum systems and Feynman integrals | 214, 279, 311 |
Shore S.N. - The Tapestry of Modern Astrophysics | 76 |
Greiner W. - Quantum mechanics: special chapters | 362 |
Hoffman B. - Strange Story of the Quantum | 79, 141 |
Phillips N.Ch. - Equivariant K-Theory and Freeness of Group Actions on C*-Algebras | 13, 15 |
D'Inverno R. - Introducing Einstein's Relatvity | 42, 96, 99, 115-17, 153 |
Mazo R.M. - Brownian Motion: Flucuations, Dynamics, and Applications | 79 |
Binmore K. - Fun and Games: A Text on Game Theory | 26, 349 |
Libermann P., Marle Ch.M. - Symplectic Geometry and Analytical Mechanics | 86 |
Eddington A.S. - Nature of the Physical World | 180, 241 |
Greiner W., Mueller B. - Quantum mechanics: symmetries | 9 |
Hume-Rothery W. - Atomic Theory for Students of Metallurgy | 19, 27 |
Milner R. - Communicating and mobile systems: the symbol for pi-calculus | 16, 29 |
West B.J., Bologna M., Grigolini P. - Physics of Fractal Operators | 12 |
Siegel W. - Fields | III-IV |
Basdevant J.-L., Dalibard J. - Quantum Mechanics | 294, 308 |
Назаров С.В., Мельников П.П., Смольников Л.П. - Программирование в пакетах MS Office | 302 |
Grosche C., Steiner F. - Handbook of Feynman path integrals | 4-5, 7-8, 10-11, 16, 30, 41, 66, 84, 97, 133 |
Auletta G. - Foundations and Interpretation of Quantum Mechanics | 10, 20 |
Sternberg S. - Group Theory and Physics | 12 |
Amit D.J. - Field theory, the renormalization group, and critical phenomena | 106, 142, 145, 366, 368, 379 |
Walley P. - Statistical reasoning with imprecise probabilities | 24, 160-61, 235-41 |
Ullman J.D., Widom J. - A first course in database systems | 352 |
Richter K. - Semiclassical theory of mesoscopic quantum systems | 20, 23, 65 |
Perrin D., Pin J.-E. - Infinite Words: Automata, Semigroups, Logic abd Games | 448 |
Cheng T.-P., Li L.-F. - Gauge Theory of Elementary Particle Physics | 3 |
Rice J. - Introduction to statistical mechanics for students of physics and physical chemistry | 79 |
Simmons G.F. - Differential Equations with Applications and Historical Notes | 378 |
Baez J.C., Muniain J.P. - Gauge theories, knots, and gravity | 136, 166, 267, 269, 398 |
Efimov A.V. - Mathematical analysis: advanced topics. Part 2. Application of some methods of mathematical and functional analysis | 257 |
Zakrzewski W.J. - Low Dimensional Sigma Models | 39, 150-152, 163, 178, 182, 184, 185, 191, 192, 266 |
Sutton O.G. - Mathematics in action | 26, 111 |
Ehlers J. (ed.) - Relativity theory and astrophysics. 1. Relativity and cosmology | 43 |
Messiah A. - Quantum mechanics. Volume 1 | 10 |
Lanczos C. - Variational principles of mechanics | 5 |
Ehlers J. (ed.) - Relativity theory and astrophysics. Relativity and cosmology | 43 |
Hermann R. - Differential geometry and the calculus of variations | 135, 136 |
Milner R. - Communicating and Mobile Systems: the Pi-Calculus | 16, 29 |
Schremmer A. - Reasonable basic algebra | 46 |
Bjorner D. - Software Engineering 3 | 13, 144 |
Atkins P. - Molecular Quantum Mechanics | 37, 484 |
Poznyak A.S., Najim K., Gomez-Ramirez E. - Self-learning control of finite Markov chains | 18, 47, 55, 74, 126, 172 |
Audin M. - Geometry | 145, 190 |
Papadopoulos G.J. (ed.), Devreese J.T. (ed.) - Path integrals and their applications in quantum, statistical, and solid state physics | 123 |
Maxwell J.C., Larmor J. - Matter and Motion | 145 |
Audin M. - Geometry | 145, 190 |
Akhiezer A.I., Berestetskii V.B. - Quantum electrodynamics | 156, 223 |
Baeten J.C.M., Middelburg С.A. - Process Algebra with timing | 2, 10 |
Ross G. - Grand Unified Theories | 30 |
Carmichael R.D. - The theory of relativity | 26, 59, 110 |
Dirac P.A.M. - The Principles of Quantum Mechanics | 128 |
Siegel W. - Fields | III-IV |
Avramidi I.G. - Heat Kernel and Quantum Gravity | 9, 78 |
Feher L. (ed.), Stipsicz A. (ed.), Szenthe J. (ed.) - Topological quantum field theories and geometry of loop spaces | 36, 46, 97 |
Greiner W., Reinhardt J. - Field quantization | 4, 32, 344 |
Conen W., Neumann G. - Coordination Technology for Collaborative Applications: Organizations, Processes, and Agents | 4, 21, 28, 34, 44, 53, 59, 80, 81, 85, 88, 91-93, 99, 102, 106, 108-112, 115, 116, 133-138, 142, 147, 148, 189, 213 |
Gould H., Tobochnik J., Christian W. - An introduction to computer simulation methods | see "Principle of least action" |
Ercolani N.M., Gabitov I.R., Levermore C.D. - Singular limits of dispersive waves | 166, 173, 216, 241, 274, 278, 305-306, 311 |
Wiedemann H. - Particle accelerator physics II | 1 |
Lemons D.S. - Perfect form: Variational principles, methods, and applications in elementary physics | 70 |
Giarratano J.C., Riley G.D. - Expert Systems: Principles and Programming | 334 |
Pommaret J.F. - Systems of partial differential equations and Lie pseudogroups | 6.1.9 |
Chandler B., Magnus W. - The history of combinatorial group theory: a case study in the history of ideas | 165, 169 |
Wooldridge M. (ed.), Muller J. (ed.), Tambe M. (ed.) - Intelligent Agents II | 26, 65, 72 |
Atkins P.W., Friedman R.S. - Molecular Quantum Mechanics | 37, 484 |
Leader E., Predazzi E. - An introduction to gauge theories and modern particle physics | 1.29 |
Марков Е., Никифоров В. - Delphi 2005 для .NET | 368 |
Frankel T. - The geometry of physics: an introduction | 152, 274, 524 |
Milonni P.W. - The quantum vacuum: introduction to quantum electrodynamics | 334 |
Cvitanovic P., Artuso R., Dahlqvist P. - Classical and quantum chaos | 489, 500 |
Флэнаган Д. - Java в примерах. Справочник | 10-16, 10-21, 10-25 |
Deligne P., Etingof P., Freed D. - Quantum fields and strings: A course for mathematicians | 7, 143, 729, 817, see also "Lagrangian" |
Deligne P., Kazhdan D., Etingof P. - Quantum fields and strings: A course for mathematicians | 7, 143, 729, 817, see also "Lagrangian" |
Zeidler E. - Applied Functional Analysis: Applications to Mathematical Physics | 393 |
Koonin S.E., Meredith D.C. - Computational Physics-Fortran Version | 16 |
Vafa C., Zaslow E. - Mirror symmetry | 146 |
Planck M. - The universe in the light of modern physics | 20, 30, 41, 93, 104 |
Zeidler E. - Oxford User's Guide to Mathematics | 920 |
Chandler D. - Introduction to modern statistical mechanics | 176 |
Schwinger J. - Particles, Sources, And Fields. Volume 3 | see also "Action principle" |
Langhaar H.R. - Energy Methods in Applied Mechanics | 239 |
Argyris J., Faust G., Haase M. - An Exploration of Chaos | 76 |
Hume-Rothery W. - Electrons, Atoms, Metals and Alloys | 51 |
Attwood S.S. - Electric and Magnetic Fields | 13, 256, 461 |
Rice J.A. - Mathematical statistics and data analysis | 571 |
Magurn B.A. - An algebraic introduction to k-theory | 135 |
Abhyankar S.S. - Lectures on Algebra Volume 1 | 651-656 |
Kushkuley A., Balanov Z. - Geometric Methods in Degree Theory for Equivariant Maps | 13 |
Silva V.D. - Mechanics and Strength of Materials | 3 |
Owen D. - A First Course in the Mathematical Foundations of Thermodynamics (Undergraduate Texts in Mathematics) | 33, 35, 68, 69, 73, 75, 77, 79, 80, 82, 84, 86, 87, 89, 93, 94, 98, 104, 109, 111, 127-129 |
McGettrick A.D. - The Definition of Programming Languages | 22, 146, 152, 204 |
Deitel H., Deitel P.J. - C. How to Program | 25, 26, 37, 56, 66 |
Bell E.T. - Mathematics: Queen and Servant of Science | 347, 350 |
Nahin P.J. - When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible | see "Least action" |
Frankel T. - The geometry of physics: An introduction | 152, 274, 524 |
Sturrock P. - Plasma Physics: An Introduction to the Theory of Astrophysical, Geophysical and Laboratory Plasmas | 36 |
Landau L.D., Lifshitz E.M. - Course of Theoretical Physics (vol.3). Quantum Mechanics. Non-relativistic Theory | 20, 165n. |
Davies P. - The New Physics | 394 |
Joyner D. - Adventures in group theory: Rubik's cube, Merlin's machine, and other mathematical toys | 110 |