Great Mathematics Books of the Twentieth Century by Ji

index

A

• Abiko. The Real Analytic Theory of Teichm¨uller Space, 136
• Abraham, Marsden Foundations of Mechanics, 512 *
• Abramenko, Brown Buildings. Theory and Applications, 455
• Acton Numerical Methods that Work, 611
• Adams, J. Stable Homotopy and Generalised Homology, 332
• Adams, R., Fournier Sobolev Spaces, 427
• Adem, Milgram Cohomology of Finite Groups, 336
• Agmon Lectures on Elliptic Boundary Value Problems, 422
• Ahlfors Complex Analysis, 115 Conformal Invariants: Topics in Geometric

Function Theory, 133 Lectures on Quasiconformal Mappings, 132

• Aigner Combinatorial Theory, 544
• Aigner, Ziegler Proofs from The Book,

107

• Ainsworth, Oden A Posteriori Error Estimation in Finite Element Analysis, 620
• Akhiezer, Glazman Theory of Linear Operators in Hilbert Space, 170
• Akivis, Rosenfeld ´ Elie Cartan (1869.1951), 75
• Aleksandrov, Kolmogorov, Lavrent’ev Mathematics: Its Content, Methods, and Meaning, 12
• Alexandro. Elementary Concepts of Topology, 38
• Alexandro., Hopf Topologie I, 316
• Alexandrov (or Alexandro.) Combinatorial Topology, 317
• Alfsen Compact Convex Sets and Boundary Integrals, 312
• Alligood, Sauer, Yorke Chaos. An Introduction to Dynamical Systems, 521
• Alon, Spencer The Probabilistic Method, 576
• Ambrosio, Fusco, Pallara Functions of Bounded Variation and Free Discontinuity Problems, 432
• Anderson, Fuller Rings and Categories of Modules, 216
• Anderson, Guionnet, Zeitouni An Introduction to Random Matrices, 581
• Andrews The Theory of Partitions, 406
• Apostol Calculus, 84 Introduction to Analytic Number Theory, 377
• Arbarello, Cornalba, Gri.ths Geometry of Algebraic Curves, II, 298
• Arbarello, Cornalba, Gri.ths, Harris Geometry of Algebraic Curves, I, 297
• Arnold, L. Random Dynamical Systems, 523
• Arnold, V. Geometrical Methods in the Theory of Ordinary Di.erential Equations, 410 Mathematical Methods of Classical Mechanics, 512 * Ordinary Di.erential Equations, 410
• Artin, E. Galois Theory, 364 Geometric Algebra, 452
• Artin, M. Algebra, 199
• Ash, Gross Fearless Symmetry. Exposing the Hidden Patterns of Numbers, 33
• Astala, Iwaniec, Martin Elliptic Partial Di.erential Equations and Quasiconformal Mappings in the Plane, 134
• Atiyah K-theory, 333
• Atiyah, MacDonald Introduction to Commutative Algebra, 219
• Attouch Variational Convergence for Functions and Operators, 269
• Aubin Nonlinear Analysis on Manifolds. Monge Amp´ere Equations, 260 Some Nonlinear Problems in Riemannian Geometry,

260

• Aubin, Cellina Di.erential Inclusions, 311
• Aubin, Ekeland Applied Nonlinear Analysis, 102
• Aubin, Frankowska Set-valued Analysis, 102
• Auslander, Reiten, Smalo Representation Theory of Artin Algebras, 492
• Axler Linear Algebra Done Right, 190

B

• Babin, Vishik Attractors of Evolution Equations, 527
• Baker Principles of Geometry, 283 Transcendental Number Theory, 382
• Ballmann, Gromov, Schroeder Manifolds of Nonpositive Curvature, 253
  • Banach Theory of Linear Operations, 163
• Bannai, Ito Algebraic Combinatorics. I. Association Schemes, 539
• Bardi, Capuzzo-Dolcetta Optimal Control and Viscosity Solutions of Hamilton-Jacobi-Bellman Equations, 434
• Barth, Hulek, Peters, Ven Compact Complex Surfaces, 299
• Bass Algebraic K-theory, 335
• Baxter Exactly Solved Models in Statistical Mechanics, 511
• Beardon Iteration of Rational Functions, 531
  • The Geometry of Discrete Groups, 468
• Beauville Surfaces Algebriques Complexes, 300
• Beckenbach, Bellman Inequalities, 111
• Becker, Weispfenning Gr¨obner Bases. A Computational Approach to Commutative Algebra, 542
• Bell Men of Mathematics, 42
• Benedetti, Petronio Lectures on Hyperbolic Geometry, 348
• Bennett, Sharpley Interpolation of Operators, 157
• Benson Representations and Cohomology, 336
• Bensoussan, Lions, Papanicolaou Asymptotic Analysis for Periodic Structures, 417
• Berge Graphs, 549
• Bergh, L¨ofstr¨om Interpolation Spaces. An Introduction, 156
• Berlekamp, Conway, Guy Winning Ways for Your Mathematical Plays, 608
• Berline, Getzler, Vergne Heat Kernels and Dirac Operators, 262
• Berman, Plemmons Nonnegative Matrices in the Mathematical

Sciences, 193

• Bertoin L´evy Processes, 569
• Besicovitch Almost Periodic Functions, 143

Besse Einstein Manifolds, 248

• • Manifolds all of Whose Geodesics are

Closed, 248

• Bhatia Matrix Analysis, 193
• Bhatia, Szeg¨o Stability Theory of Dynamical Systems, 524
• Biggs Algebraic Graph Theory, 548 *

Billingsley Convergence of Probability Measures, 560

• Probability and measure, 560
• Bingham, Goldie, Teugels Regular variation, 94
• Birkho., Ga. Lattice Theory, 200
• Birkho., Ge. Dynamical Systems, 519
• Birkho., Mac Lane A Survey of Modern Algebra, 196
• Birman Braids, Links, and Mapping Class Groups, 351
• Bishop, Crittenden Geometry of Manifolds, 236
• Bix Conics and Cubics, 289
• Bjorck, Dahlquist Numerical Methods, 612
• Blair Riemannian Geometry of Contact and Symplectic Manifolds, 292
• Bochnak, Coste, Roy Real Algebraic Geometry, 290
• Bohner, Peterson Dynamic Equations on Time Scales, 525
• Bohr Almost Periodic Functions, 144
• Bollob´as Graph Theory. An Introductory Course, 546
• Modern Graph Theory, 546
• Random Graphs, 552
• Bolza Lectures on the Calculus of Variations, 270
• Bombieri, Gubler Heights in Diophantine Geometry, 390
• Bondy, Murty Graph Theory with Applications, 549
• Borel Essays in the History of Lie Groups and Algebraic Groups, 74
• Introduction aux groupes arithm´etiques, 463 Linear Algebraic Groups, 445
• Borel, Casselman Automorphic Forms, Representations and L-functions, 403
• Borel, Wallach Continuous Cohomology, Discrete Subgroups, and Representations of Reductive Groups, 404
• Borevich, Shafarevich Number Theory, 362
• Borwein, Erd´elyi Polynomials and Polynomial Inequalities, 105
• Bosch, G¨untzer, Remmert Non-Archimedean Analysis. A Systematic Ap­proach to Rigid Analytic Geometry, 393
• Bosch, L¨utkebohmert, Raynaud N´eron Models, 393
• Bott, Tu Di.erential Forms in Algebraic Topology, 341
• Bourbaki Commutative Algebra, 220
  • Elements of the History of Mathematics, 63 Lie Groups and Lie Algebras, 442
• Bowen Equilibrium States and the Ergodic Theory of Anosov Di.eomorphisms, 535
• Boyd, El Ghaoui, Feron, Balakrishnan Linear Matrix Inequalities in System and Control Theory, 113
• Boyd, Vandenberghe Convex Optimization, 608
• Boyer A History of Mathematics, 61
• Bredon Introduction to Compact Transformation Groups, 475
  • Topology and Geometry, 327
• Breiman Probability, 557
• Brenner, Scott The Mathematical Theory of Finite Element Methods, 617
• Brezis Analyse Fonctionnelle. Th´eorie et Applications, 184
• Functional Analysis, Sobolev Spaces and Partial Di.erential Equations, 184
• Operateurs Maximaux Monotones et Semi-groupes de Contractions dans les espaces de Hilbert, 185
• Brezzi, Fortin Mixed and Hybrid Finite Element Methods, 617
• Bridson, Hae.iger Metric Spaces of Non-positive Curvature, 255
• Brieskorn, Kn¨orrer Plane Algebraic Curves, 298
• Brocker, tom Dieck Representations of Compact Lie Groups, 492
• Brouwer, Cohen, Neumaier Distance-regular Graphs, 550
• Browder Surgery on Simply-connected Manifolds, 352
• Brown Buildings, 454
• Cohomology of Groups, 335
• Bruns, Herzog Cohen-Macaulay Rings, 223 Buhler Gauss. A Biographical Study, 53
• Bump Automorphic Forms and Representations, 404
• Burago, D., Burago, Y., Ivanov A Course in Metric Geometry, 254
• Burago, Zalgaller Geometric Inequalities, 112
• Burde, Zieschang Knots, 329
• Burnside Theory of Groups of Finite Order, 207
• Burris, Sankappanavar A Course in Universal Algebra, 203
• Busemann The Geometry of Geodesics, 240
• Buser Geometry and Spectra of Compact Riemann Surfaces, 139
• Byron, Fuller Mathematics of Classical and Quantum Physics, 498

C

• Ca.arelli, Cabr´e Fully Nonlinear Elliptic Equations, 429
• Canary, Epstein, Green Notes on notes of Thurston, 346 * Canuto, Hussaini,

Quarteroni, Zang Spectral Methods in Fluid Dynamics, 432 * Carleson, Gamelin Complex Dynamics, 531 * * Carslaw, Jaeger Conduction of Heat

in Solids, 426 * Cartan Elementary Theory of Analytic Functions of One or Several Complex Variables, 115 * Cartan, Eilenberg Homological

Algebra, 226 * Carter Finite Groups of Lie Type. Conjugacy Classes and Complex Characters, 206 * Simple Groups of Lie Type, 205 * Cassels

An Introduction to Diophantine Approximation, 383 An Introduction to the Geometry of Numbers, 373 Local Fields, 371 * * Rational Quadratic Forms, 393

Cassels, Fr¨ohlich Algebraic Number Theory, 367 * Casson, Bleiler Automorphisms of Surfaces after Nielsen and Thurston, 347 * Castaing,

Valadier Convex Analysis and Measurable Multifunctions, 310 * Cercignani The Boltzmann Equation and Its Applications, 510 * Cercignani, Illner, Pulvirenti The Mathematical Theory of Dilute Gases, 510 * Cesari Optimization.Theory and Applications. Problems with Ordinary Di.erential Equations, 610 * symptotic Behavior and Stability Problems in Ordinary Di.erential Equations, 409 * Chang In.nite-dimensional Morse Theory and Multiple

Solution Problems, 420 * Chang, Keisler Model Theory, 591 * * Chavel Eigenvalues in Riemannian Geometry, 261 * * Riemannian Geometry.A Modern Introduction, 237 * Cheeger, Ebin Comparison Theorems in Riemannian Geometry, 241 * * Chen, Shaw Partial Di.erential Equations in Several

Complex Variables, 125 * Chern Complex Manifolds Without Potential Theory, 273 Chevalley Theory of Lie Groups. I. , 440 * Chihara An

Introduction to Orthogonal Polynomials, 106 * Chow, Hale Methods of Bifurcation Theory, 411 * * Chriss, Ginzburg Representation Theory and

Complex Geometry, 491 * * Chung A Course in Probability Theory, 556 * Spectral Graph Theory, 551 * * Church Introduction to Mathematical Logic, 584 * Ciarlet The Finite Element Method for Elliptic Problems, 620 * Clarke Optimization and

Nonsmooth Analysis, 103 Clemens

A Scrapbook of Complex Curve Theory, 298 * Cli.ord, Preston The Algebraic Theory of Semigroups, 203 Coddington, Levinson Theory of

Ordinary Di.erential Equations, 408 * Cohen, H. A Course in Computational Algebraic Number Theory, 370 * Advanced Topics in Computational

Number Theory, 370 * Cohen, P. Set Theory and the Continuum Hypothesis, 589 * Cohn Measure Theory, 98 * Collet, Eckmann Iterated Maps on

the Interval as Dynamical Systems, 522 * Colton, Kress Integral Equation Methods in Scattering Theory, 517 * Inverse Acoustic and

Electromagnetic Scattering Theory, 419 * Comtet Advanced Combinatorics. The Art of Finite and In.nite Expansions, 539 * Conley Isolated

Invariant Sets and the Morse Index, 412 * Connes Noncommutative Geometry, 178 * Constantin, Foias Navier-Stokes Equations, 434 * Conway,

J.B. A Course in Functional Analysis, 167 * Conway, J.H. On Numbers and Games, 607 * Conway, J.H., Burgiel, Goodman-Strauss The

Symmetries of Things, 30 * Conway, J.H., Curtis, Norton, Parker, Wilson Atlas of Finite Groups. Maximal Subgroups and Ordinary Characters for Simple Groups, 212 *

Conway, Sloane Sphere Packings, Lattices and Groups, 545 * Cormen, Leiserson, Rivest Introduction to Algorithms, 603 Cornfeld, Fomin, Sinai Ergodic Theory, 534 * Corwin, Greenleaf Representations of Nilpotent Lie Groups and Their Applications. Part I. Basic Theory and Examples, 492 * Courant, Friedrichs Supersonic Flow and Shock Waves, 433 Courant, Hilbert Methods of Mathematical Physics. Vol. I., Vol. II., 496 *

Courant, John Introduction to Calculus and Analysis, 83 Courant, Robbins What Is Mathematics?, 6 * Cover, Thomas Elements of

Information Theory, 596 * Cowen, MacCluer Composition Operators on Spaces of Analytic Functions, 155 * Cox Primes of the Form x 2 * + ny 2 * .Fermat, Class Field Theory and Complex Multiplication, 58 * Cox, Little, O’Shea Ideals, Varieties, and Algorithms, 224 * Using Algebraic Geometry, 541 * * Coxeter Introduction to Geometry, 39 * Projective Geometry, 40 * Regular Polytopes, 41 * * Coxeter, Greitzer Geometry Revisited, 40 * Coxeter, Moser Generators and Relations for Discrete Groups, 470 * Crilly Arthur Cayley, 54 *

Croft, Falconer, Guy Unsolved Problems in Geometry, 110 * Crowell, Fox Introduction to Knot Theory, 330 * Csisz´ar, K¨orner Information

Theory. Coding Theorems for Discrete Memoryless Systems, 597 * Curtain, Zwart An Introduction to In.nite-dimensional Linear

Systems Theory, 528 * Curtis Pioneers of Representation Theory: Frobenius, Burnside, Schur, and Brauer, 68 * Curtis, Reiner Methods of

Representation Theory, 215 * Curtis, Reiner Representation Theory of Finite Groups and Associative Algebras, 214 * Cvetkovi´c, Doob,

Sachs Spectra of Graphs, 551 * *

D

Da Prato, Zabczyk Stochastic Equations in In.nite Dimensions, 572 * Dacorogna Direct Methods in the Calculus of Variations, 268 *

Dafermos Hyperbolic Conservation Laws in Continuum Physics, 436 * Dal Maso An Introduction to Γ-convergence, 269 * Daubechies Ten

Lectures on Wavelets, 160 * Dauben Georg Cantor, 50 * Davenport Multiplicative Number Theory, 381 * * The Higher Arithmetic. An Introduction to the Theory of Numbers, 361 * * David, Semmes Analysis of and on Uniformly Recti.able Sets, 101 * * Davies Heat Kernels and Spectral Theory,

262 * Davis Circulant Matrices, 194 * The Geometry and Topology of Coxeter Groups, 475 * Davis, Rabinowitz Methods of Numerical Integration, 614 * de Azc´arraga, Izquierdo Lie Groups, Lie Algebras, Cohomology and Some

Applications in Physics, 483 de Boor A Practical Guide to Splines, 622 * de la Harpe Topics in Geometric Group Theory, 470 * de Melo, van Strien One-dimensional Dynamics, 522 *

Deift Orthogonal Polynomials and Random Matri­ces: a Riemann-Hilbert Approach, 581 * * Deimling Nonlinear Functional Analysis, 185 *

Deligne Cohomologie ´etale, 391 * * Demazure, Gabriel Groupes alg´ebriques. Tome I: G´eom´etrie alg´ebrique, g´en´eralit´es, groupes commutatifs, 447 * Introduction to Algebraic Geometry and Algebraic Groups, 447 * Dembo, Zeitouni Large Deviations Techniques and Applications, 574 *

Dembowski Finite Geometries, 457 * Demidovich Problems in Mathematical Analysis, 108 * Derezi´nski, G´erard Scattering Theory of

Classical and Quantum N-particle Systems, 515 * Derksen, Kemper Computational Invariant Theory, 451 * Deuschel, Stroock Large Deviations,

574 * Devaney An Introduction to Chaotic Dynamical Systems, 521 * DeVore, Lorentz Constructive Approximation, 621 * Dickson History of the

Theory of Numbers. I, II, III, 70 * Diestel Graph Theory, 547 * Diestel, Jarchow, Tonge Absolutely Summing Operators, 168 * Diestel, Uhl

Vector Measures, 100 * Dieudonn´e

A History of Algebraic and Di.erential Topology 1900.1960, 72 * Foundations of Modern Analysis, 91 * Dirac General Theory of Relativity,

504 * Dixmier C. -algebras, 181 * von Neumann Algebras, 180 * Dixon, Mortimer Permutation Groups, 210 * do Carmo Di.erential Geometry of Curves and Surfaces, 237 * Riemannian Geometry, 237 * Dolgachev

Lectures on Invariant Theory, 294 * Donaldson, Kronheimer The Geometry of Four-manifolds, 350 * Doob Classical Potential Theory and Its

Probabilistic Counterpart, 565 * Stochastic Processes, 565 * Doyle, Snell Random Walks and Electric Networks, 563 Drake, Singh

Intermediate Set Theory, 587 * Du Sautoy Symmetry: A Journey into the Patterns of Nature, 28 * Dubrovin, Fomenko, Novikov Modern

Geometry.Methods and Applications, 238 * Dudley Real Analysis and Probability, 560 * Dugundji Topology, 320 * Dunford, Schwartz Linear

Operators, 175 * Dunham Euler: the Master of Us All, 54 * Duoandikoetxea Fourier Analysis, 142 * Duren Theory of Hp Spaces, 153 Durrett

Probability: Theory and Examples, 558 * Duvaut, Lions Inequalities in Mechanics and Physics, 114 * Dym, McKean Fourier Series and Integrals, 143

E

Edwards Riemann’s Zeta Function, 375 * Eichler, Zagier The Theory of Jacobi Forms, 405 * Eilenberg Automata, Languages, and Machines, 603

Eilenberg, Steenrod Foundations of Algebraic Topology, 325 * Einstein The Meaning of Relativity, 503 Eisenbud Commutative Algebra. With

a View Toward Algebraic Geometry, 221 * Eisenhart Riemannian Geometry, 239 * Ekeland, T´emam Convex Analysis and Variational Problems,

310 * Ellis Entropy, Large Deviations, and Statistical Mechanics, 574 * Engel, Nagel One-parameter Semigroups for Linear Evolution

Equations, 176 * Engelking General Topology, 320 * Engl, Hanke, Neubauer Regularization of Inverse Problems, 419 * Enriques Le Super.cie

Algebriche, 301 * Epstein, Cannon, Holt, Levy, Paterson, Thurston Word Processing in Groups, 471 * Erd´elyi, Magnus, Oberhettinger,

Tricomi Higher Transcendental Functions, 86 * Ethier, Kurtz Markov Processes, 571 * Evans Partial Di.erential Equations, 413 Evans,

Gariepy Measure Theory and Fine Properties of Functions, 99 * Eves An Introduction to the History of Mathematics, 62 *

F

Faddeev, Takhtajan Hamiltonian Methods in the Theory of Solitons, 517 * Falconer Fractal Geometry. Mathematical Foundations and

Applications, 270 * The Geometry of Fractal Sets, 271 * Faltings, Chai Degeneration of Abelian Varieties, 387 * Faraut, Kor´anyi Analysis

on Symmetric Cones, 257 * Farkas, Kra Riemann Surfaces, 131 * Federer Geometric Measure Theory, 265 * Feit The Representation Theory of

Finite Groups, 213 Feller An Introduction to Probability Theory and its Applications, 555 * Fenchel, Nielsen Discontinuous Groups of

Isometries in the Hyperbolic Plane, 468 * Feynman,Leighton,Sands The Feynman Lectures on Physics, 502 * Field, Golubitsky Symmetry in

Chaos. A Search for Pattern in Mathematics, Art, and Nature, 31 * Fine Basic Hypergeometric Series and Applications, 406 * Fleming, Soner

Controlled Markov Processes and Viscosity Solutions, 566 * Fletcher, Markovic Quasiconformal Maps and Teichm¨uller Theory, 138 * Folland Harmonic Analysis in Phase Space, 160 * Real Analysis. Modern Techniques and Their Applications, 92 * Forster Lectures on Riemann Surfaces, 131 * Forsythe, Wasow Finite-di.erence Methods for Partial Di.erential Equations, 618 * Fraleigh A First

Course in Abstract Algebra, 200 * Frankel The Geometry of Physics, 239 * Frenkel, Lepowsky, Meurman Vertex Operator Algebras and the

Monster, 481 * Fricke, Klein Vorlesungen ¨ uber die Theorie der elliptischen Modulfunctionen, 397 * Vorlesungen uber die Theorie der automorphen Funktionen, 396 * Fried, Jarden

Field Arithmetic, 394 * Friedman Partial Di.erential Equations of Parabolic Type, 426 * Fuchs In.nite Abelian Groups, 473 Fukushima,

Oshima, Takeda Dirichlet Forms and Symmetric Markov Processes, 561 * Fulton Algebraic Curves. An Introduction to Algebraic Geometry, 288 * Intersection Theory, 302 * Introduction to Intersection Theory in Algebraic Geometry, 304 * Introduction to Toric Varieties, 307 * Young Tableaux, 486 *

Fulton, Harris Representation Theory. A .rst Course, 489 * Furstenberg Recurrence in Ergodic Theory and Combinatorial Number Theory,

536 *

G

Galdi An Introduction to the Mathematical Theory of the Navier-Stokes Equations, 434 * Gallot, Hulin, Lafontaine Riemannian Geometry,

238 * Gantmacher

The Theory of Matrices, 192 * Garcia-Cuerva, Rubio de Francia Weighted Norm Inequalities and Related Topics, 113 Gardiner Teichm¨uller

Theory and Quadratic Di.erentials, 137 * Gardiner, Lakic Quasiconformal Teichm¨uller Theory, 138 * Gardner Geometric Tomography, 312 *

Garey, Johnson Computers and Intractability, 602 * Garnett Bounded Analytic Functions, 152 * Garnett, Marshall Harmonic Measure, 153

Garrett Buildings and Classical Groups, 455 * Gasper, Rahman Basic Hypergeometric Series, 405 * Geck An Introduction to Algebraic

Geometry and Algebraic Groups, 449 * Gelbart Automorphic Forms on Ad´ele Groups, 401 * Gelbaum, Olmsted Counterexamples in Analysis, 96 *

Gelfand Lectures on Linear Algebra, 188 * Gelfand, Fomin Calculus of Variations, 268 * Gelfand, Graev, Pyatetskii-Shapiro Representation

Theory and Automorphic Functions, 172, 399 * Gelfand, Kapranov, Zelevinsky Discriminants, Resultants, and Multidimensional

Determinants, 308 * Gelfand, Manin Methods of Homological Algebra, 229 * Gelfand, Shilov, Vilenkin, Graev Generalized Functions, 172 *

Gelfond Transcendental and Algebraic Numbers, 383 George, Askey, Roy Special Functions, 87 * Georgii Gibbs Measures and Phase Transitions, 510 * Giaquinta Multiple Integrals in the Calculus of Variations and Nonlinear Elliptic Systems,

269 * Gilbarg, Trudinger Elliptic Partial Di.erential Equations of Second Order, 421 * Gilkey Invariance Theory, the Heat Equation, and

the Atiyah-Singer Index Theorem, 263 Gillman, Jerison Rings of Continuous Functions, 183 Girault, Raviart Finite Element Methods for

Navier-Stokes Equations, 619 * Giusti Minimal Surfaces and Functions of Bounded Variation, 252 * Glimm, Ja.e Quantum Physics. A

Functional Integral Point of View, 511 * Godel The Consistency of the Continuum Hypothesis, 589 * Godement Topologie alg´ebrique et th´

eorie des faisceaux, 127 * Godsil, Royle Algebraic Graph Theory, 550 * Goebel, Kirk Topics in Metric Fixed Point Theory, 321 * Gohberg,

Krein Introduction to the Theory of Linear Nonselfadjoint Operators, 170 * Goldman Complex Hyperbolic Geometry, 468 * Goldstein, Poole,

Safko Classical Mechanics, 513 Golub, Van Loan Matrix Computations, 613 Golubitsky, Guillemin Stable Mappings and Their

Singularities, 341 * Golumbic Algorithmic Graph Theory and Perfect Graphs, 551 * Goluzin Geometric Theory of Functions of a

Complex Variable, 121 * Gompf, Stipsicz 4-manifolds and Kirby Calculus, 350 * Goodman, Wallach Representations and Invariants of the

Classical Groups, 488 * Symmetry, Representations, and Invariants, 489 * Gorenstein Finite Groups, 208 * Gorenstein, Lyons, Solomon The

Classi.cation of the Finite Simple Groups, 211 * Goresky, MacPherson Strati.ed Morse theory, 343 Goursat A Course in Mathematical

Analysis, 81 * Gowers, Barrow-Green, Leader The Princeton Companion to Mathematics, 14 * Graham, Knuth, Patashnik Concrete Mathematics. A

Foundation for Computer Science, 595 * Granas, Dugundji Fixed Point Theory, 321 * Gratzer General Lattice Theory, 201 * Grauert, Remmert

Coherent Analytic Sheaves, 126 * Greenleaf Invariant Means on Topological Groups and Their Applications, 536 * Gri.ths, Harris Principles

of Algebraic Geometry, 286 * Grimmett Percolation, 577 * Grisvard Elliptic Problems in Nonsmooth Domains, 422 * Grochenig Foundations of

Time-frequency Analysis, 144 * Gromov Metric Structures for Riemannian and Non-Riemannian Spaces, 253 Asymptotic Invariants of In.nite

Groups. Geometric Group Theory, 471 * Partial Di.erential Relations, 264 * Grothendieck ´ The El´ements de g´eom´etrie alg´ebrique, 279 * Grotschel, Lov´asz, Schrijver Geometric Algorithms and Combinatorial Optimization, 609 * Gruber Convex and Discrete Geometry, 311 * Gruber, Lekkerkerker Geometry of

Numbers, 373 Grunbaum Convex Polytopes, 540 * Grunbaum, Shephard Tilings and Patterns, 31 * Tilings and Patterns. An Introduction, 32 * Guckenheimer, Holmes Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields, 524 * Guillemin, Pollack Di.erential

Topology, 341 * Guillemin, Sternberg Geometric Asymptotics, 416 * Symplectic Techniques in Physics, 290 * Gunning Introduction to Holomorphic Functions of Several Variables, 124 * Gunning, Rossi Analytic Functions of Several Complex

Variables, 123 Guy Unsolved Problems in Number Theory, 109 *

H

Hairer, Norsett, Wanner Solving Ordinary Di.erential Equations, 615 * Halberstam, Richert Sieve Methods, 379 * Hale Asymptotic Behavior

of Dissipative Systems, 526 * Theory of Functional Di.erential Equations, 530 * Hale, Verduyn Lunel Introduction to Functional-

di.erential Equations, 530 * Hall The Theory of Groups, 209 * Hall, Heyde Martingale Limit Theory and its Application, 569 * Halmos A Hilbert Space Problem Book, 169 * Finite-dimensional Vector Spaces, 189 * I Want to Be a Mathematician. An Automathography in Three Parts, 22 * Measure Theory, 97 * Naive Set Theory, 587 *

Harary Graph Theory, 548 * Hardy A Course of Pure Mathematics, 80 * A Mathematician’s Apology, 19 * Divergent Series, 94 * Hardy, Littlewood, P´olya Inequalities, 110 * Hardy, Wright An Introduction to the Theory of Numbers, 356 * Hargittai, I., Hargittai, M. Symmetry Through the Eyes of a Chemist, 35 * Symmetry: A Unifying Concept, 36 * Harris Algebraic Geometry. A First Course, 287 * Harris, Morrison Moduli of Curves, 296 * Hartman Ordinary Di.erential Equations, 409 *

Hartshorne Algebraic Geometry, 285 * Hasse Number Theory, 362 * Hatcher Algebraic Topology, 326 * Hawking, Ellis The Large Scale Structure

of Space-time, 506 * Hawkins Emergence of the Theory of Lie Groups. An Essay in the History of Mathematics 1869. 1926, 73

Hayman Meromorphic Functions, 122 * Haynes, Hedetniemi, Slater Fundamentals of Domination in Graphs, 550 * Hecke Lectures on the Theory

of Algebraic Numbers, 366 * Heinonen Lectures on Analysis on Metric Spaces, 100 * Heinonen, Kilpel¨ainen, Martio Nonlinear Potential Theory of Degenerate Elliptic Equations, 151 * Helgason Di.erential Geometry and

Symmetric Spaces, 256 * Di.erential Geometry, Lie Groups, and Symmetric Spaces, 256 * Geometric Analysis on Symmetric Spaces, 257 * Hempel

3-manifolds, 349 * Henrici Applied and Computational Complex Analysis, 119 * Henry Geometric Theory of Semilinear Parabolic Equations,

425 * Herstein Topics in Algebra, 200 * Hewitt, Ross Abstract Harmonic Analysis, 145 * Hilbert The Theory of Algebraic Number Fields, 365 * Theory of Algebraic Invariants, 450 * Hilbert, Cohn-Vossen Geometry and the Imagination, 37 * Hille, Phillips Functional Analysis and Semi-groups, 177 * Hiller Geometry of

Coxeter Groups, 474 * Hindry, Silverman Diophantine Geometry. An Introduction, 389 * Hiriart-Urruty, Lemar´echal Convex Analysis and

Minimization Algorithms, 607 * Hirsch Di.erential Topology, 340 * Hirsch, Smale Di.erential Equations, Dynamical Systems, and Linear

Algebra, 411 * Hirschfeld Projective Geometries Over Finite Fields, 456 * Hirschfeld, Thas General Galois Geometries, 456 * Hirzebruch

Topological Methods in Algebraic Geometry, 289 *

Hodge The Theory and Applications of Harmonic Integrals, 342 * Hodge, Pedoe Methods of Algebraic Geometry, 282 * Hodges A. Alan Turing:

the Enigma, 47 * Hodges W. Model Theory, 592 * Hofer, Zehnder Symplectic Invariants and Hamiltonian Dynamics, 292 * Ho.man P. The Man Who

Loved Only Numbers, 49 * Ho.man, K. Banach Spaces of Analytic Functions, 154 * Hofstadter G¨odel, Escher, Bach: an Eternal Golden Braid,

585 * Hopcroft, Ullman Introduction to Automata Theory, Languages, and Computation, 603 Hopf Di.erential Geometry in the Large, 234 * H¨

ormander An Introduction to Complex Analysis in Several Variables, 272 * Lectures on Nonlinear Hyperbolic Di.erential Equations, 415 * Linear Partial Di.erential Operators, 414 * Notions of Convexity, 415 * The Analysis of Linear Partial Di.erential Operators. I-IV, 414 *

Horn, Johnson Matrix Analysis, 191 * Topics in Matrix Analysis, 192 * Householder The Theory of Matrices in Numerical Analysis, 613 Hovey Model Categories, 337 * Howie Fundamentals of Semigroup Theory, 204 *

Hsiang Cohomology Theory of Topological Transformation Groups, 476 * Hua Additive Theory of Prime Numbers, 380 * Introduction to Number Theory, 358 * Hubbard Teichm¨uller Theory and Applications to Geometry,

Topology, and Dynamics, 137 * Hughes Random Walks and Random Environments, Humphreys Introduction to Lie Algebras and Representation Theory, 443 Linear Algebraic Groups, 446 * Re.ection Groups and Coxeter Groups, 474 * Huppert Endliche Gruppen. I., 210 * Huppert, Blackburn Finite groups. II, III, 210 * Hurewicz, Wallman Dimension Theory, 322 * Huybrechts

Complex Geometry. An Introduction, 274 * Huybrechts, Lehn The Geometry of Moduli Spaces of Sheaves, 295 * Ikeda, Watanabe Stochastic Di.erential Equations and Di.usion Processes, 572 * Imayoshi, Taniguchi An Introduction to Teichm¨uller

Spaces, 136 * Ince Ordinary Di.erential Equations, 410 * Ireland, Rosen A Classical Introduction to Modern Number Theory, 359 * Isaacs

Character Theory of Finite Groups, 214 * Isakov Inverse Problems for Partial Di.erential Equations, 418 * Ito, McKean Di.usion Processes

and their Sample Paths, 567 * Ivic The Riemann Zeta-function, 375 * Iwaniec

Topics in Classical Automorphic Forms, 402 * Iwaniec, Kowalski Analytic Number Theory, 378 *

J

Jaco Lectures on Three-manifold Topology, 349 * Jacobson Basic Algebra, 198 * Lie Algebras, 445 * Jacod, Shiryaev Limit Theorems for Stochastic Processes, 568 * Jacquet, Langlands Automorphic Forms on GL(2), 400 * James, Kerber The

Representation Theory of the Symmetric Group, 486 * Janson, Svante, Luczak, Rucinski Random Graphs, 552 * Jantzen Representations of

Algebraic Groups, 452 * Jech Set Theory, 588 * Jikov, Kozlov, Oleinik Homogenization of Di.erential Operators and Integral Functionals,

579 * John Partial Di.erential Equations, 416 * Jost Riemannian Geometry and Geometric Analysis, 260 * Joyce Compact Manifolds with Special

Holonomy, 249 * Jurdjevic Geometric Control Theory, 431 *

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Kac, M. Enigmas of Chance, 25 * Statistical Independence in Probability, Analysis and Number Theory, 557 * Kac, M., Ulam Mathematics and Logic, 10 * Kac, V. In.nite-dimensional Lie Algebras, 479 * Kadison,

Ringrose Fundamentals of the Theory of Operator Algebras, 182 * Kahane Some Random Series of Functions, 577 * Kailath Linear Systems, 528 *

Kallenberg Foundations of Modern Probability, 558 * Kanigel The Man Who Knew In.nity. A Life of the Genius Ramanujan, 49 * Kapovich

Hyperbolic Manifolds and Discrete Groups, 348 * Karatsuba, Voronin The Riemann Zeta-function, 376 * Karatzas, Shreve Brownian Motion and Stochastic Calculus, 572 * Methods of Mathematical Finance, 573 Karoubi K-theory. An Introduction, 334 * Kashiwara, Schapira Sheaves on Manifolds, 127 * Kassel Quantum Groups, 480 * Kato Perturbation

Theory for Linear Operators, 428 * Katok, Hasselblatt Introduction to the Modern Theory of Dynamical Systems, 520 * Katz A History of

Mathematics. An Introduction, 60 * Katz, Sarnak Random Matrices, Frobenius Eigenvalues, and Monodromy, 581 * Katznelson An Introduction

to Harmonic Analysis, 141 * Kechris Classical Descriptive Set Theory, 588 * Kelley General Topology, 319 * Kempf, Knudsen, Mumford, Saint-

Donat Toroidal Embeddings. I, 307 * Khinchin Continued Fractions, 364 * Three Pearls of Number Theory, 363 Kinderlehrer, Stampacchia

An Introduction to Variational Inequalities and Their Applications, 417 * Kirby, Siebenmann Foundational Essays on Topological

Manifolds, Smoothings, and Triangulations, 353 Klee, Wagon Old and New Unsolved Problems in Plane Geometry and Number Theory, 18 *

Kleene Mathematical Logic, 590 * Klein Development of Mathematics in the 19th Century, 76 * Lectures on Mathematics, 77 * Lectures on the Icosahedron and the Solution

of Equations of the Fifth Degree, 398 * Klimek Pluripotential Theory, 150 * Kline Mathematical Thought from Ancient to Modern Times, 65 *

Klingenberg Riemannian Geometry, 242 * Kloeden, Platen Numerical Solution of Stochastic Di.erential Equations, 616 * Knapp Lie Groups Beyond an Introduction, 444 * Representation Theory of Semisimple Groups. An Overview Based on Examples, 490 * Knopp Theory of Functions, 118 * Knuth The Art of Computer Programming, 595 * Kobayashi Di.erential

Geometry of Complex Vector Bundles, 249 * Hyperbolic Complex Spaces, 275 * Hyperbolic Manifolds and Holomorphic

Mappings, 275 * Transformation Groups in Di.erential Geometry, 476 * Kobayashi, Nomizu Foundations of Di.erential Geometry, 245 * Koblitz

p-adic Numbers, p-adic Analysis, and Zeta-functions, 360 * Kodaira Complex Manifolds and Deformation of Complex Structures, 273 Kolchin Di.erential Algebra and Algebraic Groups, 460 * Koll´ar

Rational Curves on Algebraic Varieties, 296 * Koll´ar, Mori Birational Geometry of Algebraic Varieties, 297 * Kolmogorov Foundations of

the Theory of Probability, 554 * Kolmogorov, Fomin Elements of the Theory of Functions and Functional Analysis, 164 * Komornik Exact

Controllability and Stabilization, 528 * Korner Fourier Analysis, 11 * The Pleasures of Counting, 10 * Kosmann-Schwarzbach The Noether Theorems. Invariance and Conservation Laws in the Twentieth Century, 35 * Krantz Function Theory of Several Complex Variables, 125 * Kuang Delay Di.erential Equations with Applications in Population Dynamics,

525 * Kuipers, Niederreiter Uniform Distribution of Sequences, 561 * Kunen Set Theory. An Introduction to Independence Proofs, 590 * Kunita

Stochastic Flows and Stochastic Di.erential Equations, 573 Kuratowski Topology, 318 * Kurosh The Theory of Groups, 209 *

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Ladyenskaja, Solonnikov, Uralceva Linear and Quasilinear Equations of Parabolic Type, 426 * Ladyzhenskaya

The Mathematical Theory of Viscous Incompressible Flow, 435 * Ladyzhenskaya, Uraltseva Linear and Quasilinear Elliptic Equations, 423

Lakshmikantham, Bainov, Simeonov Theory of Impulsive Di.erential Equations, 417 * Lam Introduction to Quadratic Forms Over Fields, 391 *

Lamb Hydrodynamics, 437 * Lancaster, Tismenetsky The Theory of Matrices, 193 Landau, Lifshitz Course of Theoretical Physics, 499 *

Landkof Foundations of Modern Potential Theory, 149 * Lang Algebra, 197 * Algebraic Number Theory, 368 * Cyclotomic Fields, 369 * Elliptic Functions, 386 * Fundamentals of Diophantine Geometry,

389 * Introduction to Modular Forms, 401 * Lange, Birkenhake Complex Abelian Varieties, 388 * Langlands Base Change for GL(2), 403 On the Functional Equations Satis.ed by Eisenstein Series, 402 * Lawler Intersections of Random Walks, 564 * Lawson, Michelsohn Spin Geometry, 247 * Lax Functional analysis, 165 * Hyperbolic Systems of Conservation Laws and the Mathematical Theory of Shock Waves, 433 Lazarsfeld Positivity in Algebraic Geometry, 305 * Lebedev Special Functions and Their

Applications, 89 * Lederman, Hill Symmetry and the Beautiful Universe, 34 * Ledoux, Talagrand Probability in Banach Spaces. Isoperimetry and Processes, 562 * Lee Riemannian Manifolds. An Introduction to Curvature, 236 * Lefschetz Algebraic Topology, 319 * Lehner Discontinuous

Groups and Automorphic Functions, 398 * Lehto Univalent Functions and Teichm¨uller Spaces, 135 * Lehto, Virtanen Quasiconformal Mappings

in the Plane, 133 Lickorish An Introduction to Knot Theory, 330 * Lidl, Niederreiter Finite Fields, 359 * Lieb, Loss Analysis, 93

Lifshitz,Pitaevskii Course of Theoretical Physics, 501 * Liggett Interacting Particle Systems, 579 * Stochastic Interacting Systems: Contact, Voter and Exclusion Processes, 579 * Lind, Marcus An Introduction to Symbolic Dynamics and Coding, 523 Lindenstrauss, Tzafriri Classical

Banach Spaces, 167 * Lions Mathematical Topics in Fluid Mechanics, 435 * Quelques m´ethodes de r´esolution des probl`emes aux limites non lin´eaires, 430 * Littlewood Littlewood’s Miscellany, 21 * Lo´eve Probability Theory, 556 * Loday Cyclic

Homology, 231 * Lojasiewicz Introduction to Complex Analytic Geometry, 126 * Lorentz, Golitschek, Makovoz Constructive Approximation.

Advanced Problems, 621 *

Lov´asz Combinatorial Problems and Exercises, 544 * Lubotzky Discrete Groups, Expanding Graphs and Invariant Measures, 467 * Lueck L2 *

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Theory, 497 * MacLane, Birkho. Algebra, 197 * MacWilliams, Sloane The Theory of Error-correcting Codes, 600 * Magnus Noneuclidean

Tesselations and Their Groups, 397 * Majid Foundations of Quantum Group Theory, 480 * Malliavin Stochastic Analysis, 575 * Mandelbrot The

Fractal Geometry of Nature, 271 * Mane Ergodic Theory and Di.erentiable Dynamics, 535 * Manin A Course in Mathematical Logic, 590 * Cubic Forms. Algebra, Geometry, Arithmetic, 394 * Marchenko Sturm Liouville Operators and Applications, 516 * Marcus Number Fields, 367 * Marden Outer Circles. An Introduction to Hyperbolic 3-

manifolds, 348 * Margulis Discrete Subgroups of Semisimple Lie Groups, 466 * Marker Model theory. An Introduction, 592 * Markushevich

Theory of Functions of a Complex Variable, 120 * Marsden, Ratiu Introduction to Mechanics and Symmetry. A Basic Exposition of Classical Mechanical Systems, 501 * Marshall, Olkin Inequalities: Theory of Majorization and Its Applications, 112 * Maskit Kleinian Groups, 469 * Maslov, Fedoriuk

Semiclassical Approximation in Quantum Mechanics, 416 * Matousek Lectures on Discrete Geometry, 540 * Matsumura Commutative Algebra, 221 * Commutative Ring Theory, 222 * Mattila Geometry of Sets and Measures in Euclidean Spaces. Fractals and Recti.ability, 266 * Mawhin, Willem Critical Point Theory and

Hamiltonian Systems, 420 * May Simplicial Objects in Algebraic Topology, 328 * Maz’ja Sobolev Spaces, 427 * McCleary User’s Guide to

Spectral Sequences, 230 * McConnell, Robson Noncommutative Noetherian Rings, 224 * McDu., Salamon

J-holomorphic Curves and Symplectic Topology, 291 * Introduction to Symplectic Topology, 291 * McKean Stochastic Integrals, 567 * McMullen Complex Dynamics and Renormalization, 532 * Renormalization and 3-manifolds Which Fiber Over the Circle, 532 * McWeeny Symmetry: An Introduction to Group Theory and Its Applications, 30 * Mehta Random Matrices, 580 * Melrose

The Atiyah-Patodi-Singer Index Theorem, 424 * Meyer, Coifman Wavelets and Operators, 161 * Meyn, Tweedie Markov Chains and Stochastic

Stability, 566 * Milman, Schechtman Asymptotic Theory of Finite-dimensional Normed Spaces, 313 Milne ´ Etale Cohomology, 390 * Milnor Dynamics in One Complex Variable. Introductory Lectures, 531 * Introduction to Algebraic K-theory, 334 * Lectures on the h-cobordism Theorem, 339 * Morse Theory, 339 *

Singular Points of Complex Hypersurfaces, 289 * Topology from the Di.erentiable Viewpoint,

340 * Milnor, Stashe. Characteristic Classes, 324 * Misner, Thorne, Wheeler Gavitation, 507 * Mitrinovi´c Analytic Inequalities, 111 * Miyake

Modular Forms, 401 * Moeglin, Waldspurger Spectral Decomposition and Eisenstein Series. Une paraphrase de l’ ´ Ecriture, 403 Monastyrsky Riemann, Topology, and Physics, 52 * Montgomery, D., Zippin Topological Transformation Groups, 477 * Montgomery, H. Ten Lectures on the Interface Between Analytic Number Theory and Harmonic Analysis, 378 * Montgomery, H., Vaughan Multiplicative Number Theory. I. Classical Theory, 381 * Montgomery, R. A Tour of Subriemannian Geometries,

Their Geodesics and Applications, 247 * Montgomery, S. Hopf Algebras and Their Actions on Rings, 481 * Moore Foundations of Point Set

Theory, 319 * Morgan Geometric Measure Theory, A Beginner’s Guide, 267 * Morrey Multiple Integrals in the Calculus of Variations, 267 *

Morrow, Kodaira Complex Manifolds, 274 * Morse The Calculus of Variations in the Large, 339 * Moschovakis Descriptive Set Theory, 588 *

Moser Stable and Random Motions in Dynamical Systems, 519 * Mostow Strong Rigidity of Locally Symmetric Spaces, 464 * Motohashi Spectral

Theory of the Riemann Zeta-function, 376 * Mukai An Introduction to Invariants and Moduli, 295 * Mumford Abelian Varieties, 387 * Algebraic Geometry. I, 284 * Lectures on Curves on an Algebraic Surface, 302 * Tata Lectures on Theta, 387 * The Red book of Varieties and Schemes, 283

Mumford, Fogarty, Kirwan Geometric Invariant Theory, 293 Mumford, Series, Wright Indra’s Pearls, 36 * Munkres Elements of Algebraic Topology, 327 * Topology: A First Course, 327 * Murray Mathematical Biology, 526 *

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of Sumsets, 380 * Necas Les m´ethodes directes en th´eorie des ´equations elliptiques, 421 * Nehari Conformal Mapping, 121 * Neugebauer A

History of Ancient Mathematical Astronomy, 70 * Neukirch Algebraic Number Theory, 369 * Neukirch, Schmidt, Wingberg Cohomology of Number

Fields, 372 * Newman The World of Mathematics. Vols. I-IV, 66 * Newstead Introduction to Moduli Problems and Orbit Spaces, 293 Nielsen,

Chuang Quantum Computation and Quantum Information, 597 * Nocedal, Wright Numerical Optimization, 609 * Novikov, Manakov, Pitaevskii, Zakharov Theory of Solitons. The Inverse Scattering Method, 515 * Nualart The Malliavin Calculus and

Related Topics, 575 * O====== O’Meara Introduction to Quadratic Forms, 392 * O’Neill Semi-Riemannian Geometry, 246 * Oda Convex Bodies and Algebraic Geometry, 306 *

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Solution of Nonlinear Equations in Several Variables , 616 * Oxley Matroid Theory, 542 *

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of theAmerican Mathematical Research Community, 1876.1900, 71 * Passman The Algebraic Structure of Group Rings, 217 * Payne, Thas Finite

Generalized Quadrangles, 456 * Pazy

Semigroups of Linear Operators and Applica­tions to Partial Di.erential Equations, 176 * Pedersen C. -algebras and Their Automorphism Groups, 182 * Penrose The Road to Reality. A complete Guide to the Laws of the Universe, 508 * Perko

Di.erential equations and dynamical systems, 522 * Pesin Dimension Theory in Dynamical Systems, 323 Petersen, K. Ergodic Theory, 534 *

Petersen, P. Riemannian Geometry, 241 * Petkovsek, Wilf, Zeilberger A = B, 599 * Petrovski Ordinary Di.erential Equations, 409 * Phillips

Scattering Theory for Automorphic Functions, 402 * Pierce Associative Algebras, 215 * Pisier The Volume of Convex Bodies and Banach Space

Geometry, 313 Platonov, Rapinchuk Algebraic Groups and Number Theory, 448 * Podlubny Fractional Di.erential Equations, 95 * P´olya How to

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Mathematics and Plausible Reasoning, 16 * P´olya,Szeg¨o Isoperimetric Inequalities in Mathematical Physics, 263 Problems and Theorems

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Potential Theory in the Complex Plane, 150 * Ratcli.e Foundations of Hyperbolic Manifolds, 348 * Ravenel Complex Cobordism and Stable

Homotopy Groups of Spheres, 332 * Reed, Simon Methods of Modern Mathematical Physics, 514 * Reid Julia. A Life in Mathematics, 45 * Courant in G¨ottingen and New York, 45 * Hilbert, 44 * Neyman.From Life, 45 * The Search for E.T.

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Continuous Martingales and Brownian Motion, 568 * Richardson, Urbanke Modern Coding Theory, 601 * Richtmyer, Morton Di.erence Methods for

Initial-value Problems, 619 * Riesz, Sz.-Nagy Functional Analysis, 164 *

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the Theory of Groups, 210 * Rockafellar Convex Analysis, 309 * Rockafellar, Wets Variational analysis, 101 * Rogers Hausdor. Measures, 99 * Packing and Covering, 373 Theory of Recursive Functions and E.ective Computability, 594 * Rolfsen Knots and Links, 328 * Ronan Lectures on Buildings, 454 * Symmetry and the Monster. One of the Greatest Quests of Mathematics, 32 * Rosen, J. Symmetry Discovered: Concepts and Applications in Nature and Science, 29 * Symmetry in

Science. An Introduction to the General Theory, 30 * Symmetry Rules. How Science and Nature Are Founded on Symmetry, 30 * Rosen, M.

Number Theory in Function Fields, 359 * Rosenberg Algebraic K-theory and Its Applications, 334 * Ross Introduction to Probability Models,

559 * Rotman An Introduction to Homological Algebra, 228 * Rourke, Sanderson Introduction to Piecewise-linear Topology, 351 * Rudin Function Theory in the Unit Ball of Cn,90 * Functional Analysis, 166 * Real and Complex Analysis, 90 * The Way I Remember It, 26 * Ruelle Statistical Mechanics: Rigorous Results, 509 * Thermodynamic Formalism. The Mathemat­ical Structures of Classical Equilibrium Statistical Mechanics, 510 * Russell Introduction to Mathematical Philosophy, 586 *

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Random Processes, 570 * Santal´o Integral Geometry and Geometric Probability, 251 * Sarnak Some Applications of Modular Forms, 467 * Sato

L´evy Processes and In.nitely Divisible Distributions, 569 * Schaefer Banach Lattices and Positive Operators, 202 * Topological Vector Spaces, 168 * Scharlau Quadratic and Hermitian Forms, 392 * Scharlau, Opolka From Fermat to Minkowski. Lectures on the Theory of Numbers and its Historical Development, 59 * Schechter

My Brain is Open. The Mathematical Journeys of Paul Erd˝os, 48 * Schneider Convex Bodies: the Brunn-Minkowski Theory, 312 * Schoen, Yau Lectures on Di.erential Geometry, 259 * Lectures on Harmonic Maps, 259 * Schrijver Theory of Linear and Integer Programming, 606 * Schroeder Number Theory in Science and Communication, 360 * Schumaker Spline

Functions: Basic Theory, 622 * Schwartz Th´eorie des Distributions, 171 * Seifert, Threlfall Seifert and Threlfall: A Textbook of

Topology, 318 * Serre A Course in Arithmetic, 385 * Complex Semisimple Lie Algebras, 441 * Galois Cohomology, 372 * Linear Representations of Finite

Groups, 484 * LocalAlgebra,220 * Local Fields, 371 * Trees, 466 * Shafarevich Basic Algebraic Geometry, 281 * Basic Notions of Algebra, 204 * Shannon, Weaver The Mathematical Theory of Communication, 599 * Sharpe Di.erential Geometry, 250 * Shelah Proper and Improper Forcing,

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424 * Siegel Topics in Complex Function Theory, 276 * Siegel, Moser Lectures on Celestial Mechanics, 518 * Silverman Advanced Topics in the

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433 Soare Recursively Enumerable Sets and Degrees. A Study of Computable Functions and Computably Generated Sets, 593 Spanier Algebraic Topology, 326 * Spicci Beyond the Limit: The Dream of Sofya Kovalevskaya, 47 * Spitzer Principles of Random Walks, 562 *

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Groups, 447 * Stanley Enumerative Combinatorics, 538 * Steenrod

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Singular Integrals and Di.erentiability Properties of Functions, 157 * Stein, Weiss Introduction to Fourier Analysis on Euclidean

Spaces, 158 * Steinberg Lectures on Chevalley Groups, 448 * Sternberg Group Theory and Physics, 482 * Stewart Introduction to Matrix Computations, 613 Why Beauty is Truth, 28 * Stichtenoth Algebraic Function Fields and Codes, 601 * Stillwell Mathematics and its History, 63 Strang, Fix An Analysis of the Finite

Element Method, 618 * Strebel Quadratic Di.erentials, 139 * Stroock Probability Theory, an Analytic View, 559 * Stroock, Varadhan

Multidimensional Di.usion Processes, 570 * Struik A Concise History of Mathematics, 60 * Struwe Variational Methods. Applications to Non­linear Partial Di.erential Equations and Hamiltonian Systems, 431 *

Stubhaug Niels Henrik Abel and His Times, 46 * Sturmfels Gr¨obner Bases and Convex Polytopes, 541 * Sweedler Hopf Algebras, 481 * Switzer

Algebraic Topology.Homotopy and Homology, 327 * Sz.-Nagy, Foias Harmonic Analysis of Operators on Hilbert Space, 146 * Szeg¨o Orthogonal Polynomials, 106 *

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Mathematical Logic, 1879.1931, 585 * van Lint Introduction to Coding Theory, 601 * Varadarajan Lie Groups, Lie Algebras, and Their

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Weinberger The Topological Classi.cation of Strati.ed Spaces, 344 * Wells Di.erential Analysis on Complex Manifolds, 275 * Welsh Matroid

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West Introduction to Graph Theory, 547 * Weyl Space, Time, Matter, 505 * Symmetry, 27 * The Classical Groups. Their Invariants and Representations, 487 * The Concept of a Riemann Surface, 128 * The Theory of Groups and Quantum Mechan­ics, 497 * Wheeden, Zygmund Measure and Integral, 98 * Whitehead Elements of Homotopy Theory, 337 * Whitham Linear and Nonlinear Waves, 436 *

Whittaker, Watson A Course of Modern Analysis, 85 * Whyburn Analytic Topology, 478 * Widder The Laplace Transform, 145 * Wiener I am a

Mathematician. The later Life of a Prodigy, 23 Cybernetics, or Control and Communication in the Animal and the Machine, 597 * Ex-prodigy. My Childhood and Youth, 23 Extrapolation, Interpolation, and Smoothing

of Stationary Time Series, 598 * Wilkinson The Algebraic Eigenvalue Problem, 612 * Willem Minimax Theorems, 420 * Woess Random Walks on

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Zariski Algebraic Surfaces, 301 * Zariski, Samuel Commutative Algebra, 219 * Zassenhaus The Theory of Groups, 207 * Zee Fearful Symmetry.

The Search for Beauty in Modern Physics, 34 * Zeidler Nonlinear Functional Analysis and Its Applications, 186 * Zhu Operator Theory in

Function Spaces, 155 * Ziegler Lectures on Polytopes, 539 * Ziemer Weakly Di.erentiable Functions. Sobolev Spaces and Functions of

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