Graduate Texts in Mathematics

1 TAKEUTI/ZARING. Introduction to
Axiomatic Set Theory. 2nd ed.
2 OXTOBY. Measure and Category. 2nd ed.
3 SCHAEFER. Topological Vector Spaces.
2nd ed.
4 HILTON/STAMMBACH. A Course in
Homological Algebra. 2nd ed.
5 MAC LANE. Categories for the Working
Mathematician. 2nd ed.
6 HUGHES/PIPER. Projective Planes.
7 J.-P. SERRE. A Course in Arithmetic.
8 TAKEUTI/ZARING. Axiomatic Set Theory.
9 HUMPHREYS. Introduction to Lie Algebras
and Representation Theory.
10 COHEN. A Course in Simple Homotopy
Theory.
11 CONWAY. Functions of One Complex
Variable I. 2nd ed.
12 BEALS. Advanced Mathematical Analysis.
13 ANDERSON/FULLER. Rings and Categories of
Modules. 2nd ed.
14 GOLUBITSKY/GUILLEMIN. Stable Mappings
and Their Singularities.
15 BERBERIAN. Lectures in Functional Analysis
and Operator Theory.
16 WINTER. The Structure of Fields.
17 ROSENBLATT. Random Processes. 2nd ed.
18 HALMOS. Measure Theory.
19 HALMOS. A Hilbert Space Problem Book.
2nd ed.
20 HUSEMOLLER. Fibre Bundles. 3rd ed.
21 HUMPHREYS. Linear Algebraic Groups.
22 BARNES/MACK. An Algebraic Introduction
to Mathematical Logic.
23 GREUB. Linear Algebra. 4th ed.
24 HOLMES. Geometric Functional Analysis
and Its Applications.
25 HEWITT/STROMBERG. Real and Abstract
Analysis.
26 MANES. Algebraic Theories.
27 KELLEY. General Topology.
28 ZARISKI/SAMUEL. Commutative Algebra.
Vol.I.
29 ZARISKI/SAMUEL. Commutative Algebra.
Vol.II.
30 JACOBSON. Lectures in Abstract Algebra I.
Basic Concepts.
31 JACOBSON. Lectures in Abstract Algebra II.
Linear Algebra.
32 JACOBSON. Lectures in Abstract Algebra III.
Theory of Fields and Galois Theory.
33 HIRSCH. Differential Topology.
34 SPITZER. Principles of Random Walk.
2nd ed.
35 ALEXANDER/WERMER. Several Complex
Variables and Banach Algebras. 3rd ed.
36 KELLEY/NAMIOKA et al. Linear
Topological Spaces.
37 MONK. Mathematical Logic.
38 GRAUERT/FRITZSCHE. Several Complex
Variables.
39 ARVESON. An Invitation to C*-Algebras.
40 KEMENY/SNELL/KNAPP. Denumerable
Markov Chains. 2nd ed.
41 APOSTOL. Modular Functions and
Dirichlet Series in Number Theory.
2nd ed.
42 J.-P. SERRE. Linear Representations of
Finite Groups.
43 GILLMAN/JERISON. Rings of Continuous
Functions.
44 KENDIG. Elementary Algebraic Geometry.
45 LOÈVE. Probability Theory I. 4th ed.
46 LOÈVE. Probability Theory II. 4th ed.
47 MOISE. Geometric Topology in
Dimensions 2 and 3.
48 SACHS/WU. General Relativity for
Mathematicians.
49 GRUENBERG/WEIR. Linear Geometry.
2nd ed.
50 EDWARDS. Fermat’s Last Theorem.
51 KLINGENBERG. A Course in Differential
Geometry.
52 HARTSHORNE. Algebraic Geometry.
53 MANIN. A Course in Mathematical Logic.
54 GR***ER/WATKINS. Combinatorics with
Emphasis on the Theory of Graphs.
55 BROWN/PEARCY. Introduction to Operator
Theory I: Elements of Functional Analysis.
56 MASSEY. Algebraic Topology: An
Introduction.
57 CROWELL/FOX. Introduction to Knot Theory.
58 KOBLITZ. p-adic Numbers, p-adic Analysis,
and Zeta-Functions. 2nd ed.
59 LANG. Cyclotomic Fields.
60 ARNOLD. Mathematical Methods in
Classical Mechanics. 2nd ed.
61 WHITEHEAD. Elements of Homotopy
Theory.
62 KARGAPOLOV/MERLZJAKOV. Fundamentals
of the Theory of Groups.
63 BOLLOBAS. Graph Theory.
64 EDWARDS. Fourier Series. Vol. I. 2nd ed.
65 WELLS. Differential Analysis on Complex
Manifolds. 2nd ed.
66 WATERHOUSE. Introduction to Affine
Group Schemes.
67 SERRE. Local Fields.
68 WEIDMANN. Linear Operators in Hilbert
Spaces.
69 LANG. Cyclotomic Fields II.
70 MASSEY. Singular Homology Theory.
71 FARKAS/KRA. Riemann Su***ces. 2nd ed.
72 STILLWELL. Classical Topology and
Combinatorial Group Theory. 2nd ed.
73 HUNGERFORD. Algebra.
74 D***ENPORT. Multiplicative Number
Theory. 3rd ed.
75 HOCHSCHILD. Basic Theory of Algebraic
Groups and Lie Algebras.
76 IITAKA. Algebraic Geometry.
77 HECKE. Lectures on the Theory of
Algebraic Numbers.
78 BURRIS/SANKAPPAN***AR. A Course in
Universal Algebra.
79 WALTERS. An Introduction to Ergodic
Theory.
80 ROBINSON. A Course in the Theory of
Groups. 2nd ed.
81 FORSTER. Lectures on Riemann Su***ces.
82 BOTT/TU. Differential Forms in Algebraic
Topology.
83 WASHINGTON. Introduction to Cyclotomic
Fields. 2nd ed.
84 IRELAND/ROSEN. A Classical Introduction
to Modern Number Theory. 2nd ed.
85 EDWARDS. Fourier Series. Vol. II. 2nd ed.
86 VAN LINT. Introduction to Coding Theory.
2nd ed.
87 BROWN. Cohomology of Groups.
88 PIERCE. Associative Algebras.
89 LANG. Introduction to Algebraic and
Abelian Functions. 2nd ed.
90 BRØNDSTED. An Introduction to Convex
Polytopes.
91 BEARDON. On the Geometry of Discrete
Groups.
92 DIESTEL. Sequences and Series in Banach
Spaces.
93 DUBROVIN/FOMENKO/NOVIKOV. Modern
Geometry—Methods and Applications.
Part I. 2nd ed.
94 WARNER. Foundations of Differentiable
Manifolds and Lie Groups.
95 SHIRYAEV. Probability. 2nd ed.
96 CONWAY. A Course in Functional
Analysis. 2nd ed.
97 KOBLITZ. Introduction to Elliptic Curves
and Modular Forms. 2nd ed.
98 BRÖCKER/TOM DIECK. Representations of
Compact Lie Groups.
99 GROVE/BENSON. Finite Reflection Groups.
2nd ed.
100 BERG/CHRISTENSEN/RESSEL. Harmonic
Analysis on Semigroups: Theory of
Positive Definite and Related Functions.
101 EDWARDS. Galois Theory.
102 VARADARAJAN. Lie Groups, Lie Algebras
and Their Representations.
103 LANG. Complex Analysis. 3rd ed.
104 DUBROVIN/FOMENKO/NOVIKOV. Modern
Geometry—Methods and Applications.
Part II.
105 LANG. SL2(R).
106 SILVERMAN. The Arithmetic of Elliptic
Curves.
107 OLVER. Applications of Lie Groups to
Differential Equations. 2nd ed.
108 RANGE. Holomorphic Functions and
Integral Representations in Several
Complex Variables.
109 LEHTO. Univalent Functions and
Teichmüller Spaces.
110 LANG. Algebraic Number Theory.
111 HUSEMÖLLER. Elliptic Curves. 2nd ed.
112 LANG. Elliptic Functions.
113 KARATZAS/SHREVE. Brownian Motion and
Stochastic Calculus. 2nd ed.
114 KOBLITZ. A Course in Number Theory and
Cryptography. 2nd ed.
115 BERGER/GOSTIAUX. Differential Geometry:
Manifolds, Curves, and Su***ces.
116 KELLEY/SRINIVASAN. Measure and Integral.
Vol. I.
117 J.-P. SERRE. Algebraic Groups and Class
Fields.
118 PEDERSEN. Analysis Now.
119 ROTMAN. An Introduction to Algebraic
Topology.
120 ZIEMER. Weakly Differentiable Functions:
Sobolev Spaces and Functions of Bounded
Variation.
121 LANG. Cyclotomic Fields I and II.
Combined 2nd ed.
122 REMMERT. Theory of Complex Functions.
Readings in Mathematics
123 EBBINGHAUS/HERMES et al. Numbers.
Readings in Mathematics
124 DUBROVIN/FOMENKO/NOVIKOV. Modern
Geometry—Methods and Applications
Part III.
125 BERENSTEIN/GAY. Complex Variables:
An Introduction.
126 BOREL. Linear Algebraic Groups. 2nd ed.
127 MASSEY. A Basic Course in Algebraic
Topology.
128 RAUCH. Partial Differential Equations.
129 FULTON/HARRIS. Representation Theory: A
First Course.
Readings in Mathematics
130 DODSON/POSTON. Tensor Geometry.
131 LAM. A First Course in Noncommutative
Rings. 2nd ed.
132 BEARDON. Iteration of Rational Functions.
133 HARRIS. Algebraic Geometry: A First
Course.
134 ROMAN. Coding and Information Theory.
135 ROMAN. Advanced Linear Algebra.
2nd ed.
136 ADKINS/WEINTRAUB. Algebra: An Approach
via Module Theory.
137 AXLER/BOURDON/RAMEY. Harmonic
Function Theory. 2nd ed.
138 COHEN. A Course in Computational
Algebraic Number Theory.
139 BREDON. Topology and Geometry.
140 AUBIN. Optima and Equilibria. An
Introduction to Nonlinear Analysis.
141 BECKER/WEISPFENNING/KREDEL. Gröbner
Bases. A Computational Approach to
Commutative Algebra.
142 LANG. Real and Functional Analysis.
3rd ed.
143 DOOB. Measure Theory.
144 DENNIS/FARB. Noncommutative
Algebra.
145 VICK. Homology Theory. An
Introduction to Algebraic Topology.
2nd ed.
146 BRIDGES. Computability: A
Mathematical Sketchbook.
147 ROSENBERG. Algebraic K-Theory and
Its Applications.
148 ROTMAN. An Introduction to the
Theory of Groups. 4th ed.
149 RATCLIFFE. Foundations of
Hyperbolic Manifolds.
150 EISENBUD. Commutative Algebra
with a View Toward Algebraic
Geometry.
151 SILVERMAN. Advanced Topics in
the Arithmetic of Elliptic Curves.
152 ZIEGLER. Lectures on Polytopes.
153 FULTON. Algebraic Topology: A First
Course.
154 BROWN/PEARCY. An Introduction to
Analysis.
155 KASSEL. Quantum Groups.
156 KECHRIS. Classical Descriptive Set
Theory.
157 MALLI***IN. Integration and
Probability.
158 ROMAN. Field Theory.
159 CONWAY. Functions of One Complex
Variable II.
160 LANG. Differential and Riemannian
Manifolds.
161 BORWEIN/ERDÉLYI. Polynomials and
Polynomial Inequalities.
162 ALPERIN/BELL. Groups and
Representations.
163 DIXON/MORTIMER. Permutation
Groups.
164 NATHANSON. Additive Number Theory:
The Classical Bases.
165 NATHANSON. Additive Number Theory:
Inverse Problems and the Geometry of
Sumsets.
166 SHARPE. Differential Geometry: Cartan’s
Generalization of Klein’s Erlangen
Program.
167 MORANDI. Field and Galois Theory.
168 EWALD. Combinatorial Convexity and
Algebraic Geometry.
169 BHATIA. Matrix Analysis.
170 BREDON. Sheaf Theory. 2nd ed.
171 PETERSEN. Riemannian Geometry.
172 REMMERT. Classical Topics in Complex
Function Theory.
173 DIESTEL. Graph Theory. 3rd ed.
174 BRIDGES. Foundations of Real and
Abstract Analysis.
175 LICKORISH. An Introduction to Knot
Theory.
176 LEE. Riemannian Manifolds.
177 NEWMAN. Analytic Number Theory.
178 CLARKE/LEDYAEV/STERN/WOLENSKI.
Nonsmooth Analysis and Control
Theory.
179 DOUGLAS. Banach Algebra Techniques in
Operator Theory. 2nd ed.
180 SRIVAST***A. A Course on Borel Sets.
181 KRESS. Numerical Analysis.
182 WALTER. Ordinary Differential
Equations.
183 MEGGINSON. An Introduction to Banach
Space Theory.
184 BOLLOBAS. Modern Graph Theory.
185 COX/LITTLE/O’SHEA. Using Algebraic
Geometry. 2nd ed.
186 RAMAKRISHNAN/VALENZA. Fourier
Analysis on Number Fields.
187 HARRIS/MORRISON. Moduli of Curves.
188 GOLDBLATT. Lectures on the Hyperreals:
An Introduction to Nonstandard Analysis.
189 LAM. Lectures on Modules and Rings.
190 E***ONDE/MURTY. Problems in Algebraic
Number Theory. 2nd ed.
191 LANG. Fundamentals of Differential
Geometry.
192 HIRSCH/LACOMBE. Elements of Functional
Analysis.
193 COHEN. Advanced Topics in
Computational Number Theory.
194 ENGEL/NAGEL. One-Parameter Semigroups
for Linear Evolution Equations.
195 NATHANSON. Elementary Methods in
Number Theory.
196 OSBORNE. Basic Homological Algebra.
197 EISENBUD/HARRIS. The Geometry of
Schemes.
198 ROBERT. A Course in p-adic Analysis.
199 HEDENMALM/KORENBLUM/ZHU. Theory of
Bergman Spaces.
200 BAO/CHERN/SHEN. An Introduction to
Riemann–Finsler Geometry.
201 HINDRY/SILVERMAN. Diophantine
Geometry: An Introduction.
202 LEE. Introduction to Topological
Manifolds.
203 SAGAN. The Symmetric Group:
Representations, Combinatorial
Algorithms, and Symmetric Functions.
204 ESCOFIER. Galois Theory.
205 FÉLIX/HALPERIN/THOMAS. Rational
Homotopy Theory. 2nd ed.
206 MURTY. Problems in Analytic Number
Theory.
Readings in Mathematics
207 GODSIL/ROYLE. Algebraic Graph Theory.
208 CHENEY. Analysis for Applied
Mathematics.
209 ARVESON. A Short Course on Spectral
Theory.
210 ROSEN. Number Theory in Function
Fields.
211 LANG. Algebra. Revised 3rd ed.
212 MATOUŠEK. Lectures on Discrete
Geometry.
213 FRITZSCHE/GRAUERT. From Holomorphic
Functions to Complex Manifolds.
214 JOST. Partial Differential Equations.
2nd ed.
215 GOLDSCHMIDT. Algebraic Functions and
Projective Curves.
216 D. SERRE. Matrices: Theory and
Applications.
217 MARKER. Model Theory: An
Introduction.
218 LEE. Introduction to Smooth Manifolds.
219 MACLACHLAN/REID. The Arithmetic of
Hyperbolic 3-Manifolds.
220 NESTRUEV. Smooth Manifolds and
Observables.
221 GRÜNBAUM. Convex Polytopes.
2nd ed.
222 HALL. Lie Groups, Lie Algebras, and
Representations: An Elementary
Introduction.
223 VRETBLAD. Fourier Analysis and
Its Applications.
224 WALSCHAP. Metric Structures in
Differential Geometry.
225 BUMP: Lie Groups.
226 ZHU. Spaces of Holomorphic Functions in
the Unit Ball.
227 MILLER/STURMFELS. Combinatorial
Commutative Algebra.
228 DIAMOND/SHURMAN. A First Course in
Modular Forms.
229 EISENBUD. The Geometry of Syzygies.
230 STROOCK. An Introduction to Markov
Processes.
231 BJÖRNER/BRENTI. Combinatorics of
Coxeter Groups.
232 EVEREST/WARD. An Introduction to
Number Theory.
233 ALBIAC/KALTON. Topics in Banach Space
Theory
234 JORGENSEN. Analysis and Probability.
235 SEPANSKI. Compact Lie Groups.
236 GARNETT. Bounded Analytic Functions.
237 MARTINEZ-***ENDANO/ROSENTHAL. An
Introduction to Operators on the Hardy-
Hilbert Space
238 AIGNER. A Course in Enumeration.
239 COHEN. Number Theory – Volume I:
Tools and Diophantine Equations.
240 COHEN. Number Theory – Volume II:
Analytic and Modern Tools
241 SILVERMAN. The Arithmetic of Dynamical
Systems.
242 GRILLET. Abstract Algebra. 2nd ed.
243 GEOGHEGAN Topological Methods in
Group Theory.
244 BONDY MURTY. Graph Theory.
245 GILMAN KRA RODRIGUEZ Complex Analysis.
246 KANIUTH. A Course in Commutative Banach
Algebras.
247 KASSEL/TURAEV. Braid Groups
2 48 ABRAMENKO . Buildings: Theory and
Applications.
249 GRAFAKOS. Classical Fourier Analysis.
250 GRAFAKOS. Modern Fourier Analysis.
251 WILSON. The Final Simple Groups.
. Distributions 252 GRUBB and Operators.
253 MACCLUER. Elementary Functional Analysis
254 STICHTENOTH. Algebraic Function Fields
and Codes, 2nd ed.