Page 539 - Advanced Linear Algebra
P. 539
Graduate Texts in Mathematics
(continued from page ii)
76 IITAKA. Algebraic Geometry. 107 OLVER. Applications of Lie Groups to
77 HECKE. Lectures on the Theory of Algebraic Differential Equations. 2nd ed.
Numbers. 108 RANGE. Holomorphic Functions and
78 BURRIS/SANKAPPANAVAR. A Course in Integral Representations in Several
Universal Algebra. Complex Variables.
79 WALTERS. An Introduction to Ergodic 109 LEHTO. Univalent Functions and
Theory. Teichmüller Spaces.
80 ROBINSON. A Course in the Theory of 110 LANG. Algebraic Number Theory.
Groups. 2nd ed. 111 HUSEMÖLLER. Elliptic Curves. 2nd ed.
81 FORSTER. Lectures on Riemann Surfaces. 112 LANG. Elliptic Functions.
82 BOTT/TU. Differential Forms in Algebraic 113 KARATZAS/SHREVE. Brownian Motion and
Topology. Stochastic Calculus. 2nd ed.
83 WASHINGTON. Introduction to Cyclotomic 114 KOBLITZ. A Course in Number Theory and
Fields. 2nd ed. Cryptography. 2nd ed.
84 IRELAND/ROSEN. A Classical Introduction to 115 BERGER/GOSTIAUX. Differential Geometry:
Modern Number Theory. 2nd ed. Manifolds, Curves, and Surfaces.
85 EDWARDS. Fourier Series. Vol. II. 2nd ed. 116 KELLEY/SRINIVASAN. Measure and Integral.
86 VAN LINT. Introduction to Coding Theory. Vol. I.
2nd ed. 117 J.-P. SERRE. Algebraic Groups and Class
87 BROWN. Cohomology of Groups. Fields.
88 PIERCE. Associative Algebras. 118 PEDERSEN.Analysis Now.
89 LANG. Introduction to Algebraic and 119 ROTMAN. An Introduction to Algebraic
Abelian Functions. 2nd ed. Topology.
90 BRØNDSTED. An Introduction to Convex 120 ZIEMER. Weakly Differentiable Functions:
Polytopes. Sobolev Spaces and Functions of Bounded
91 BEARDON. On the Geometry of Discrete Variation.
Groups. 121 LANG. Cyclotomic Fields I and II.
92 DIESTEL. Sequences and Series in Banach Combined 2nd ed.
Spaces. 122 REMMERT. Theory of Complex Functions.
93 DUBROVIN/FOMENKO/NOVIKOV. Modern Readings in Mathematics
Geometry—Methods and Applications. 123 EBBINGHAUS/HERMES et al. Numbers.
Part I. 2nd ed. Readings in Mathematics
94 WARNER. Foundations of Differentiable 124 DUBROVIN/FOMENKO/NOVIKOV. Modern
Manifolds and Lie Groups. Geometry—Methods and Applications
95 SHIRYAEV. Probability. 2nd ed. Part III.
96 CONWAY. A Course in Functional Analysis. 125 BERENSTEIN/GAY. Complex Variables: An
2nd ed. Introduction.
97 KOBLITZ. Introduction to Elliptic Curves and 126 BOREL. Linear Algebraic Groups. 2nd ed.
Modular Forms. 2nd ed. 127 MASSEY. A Basic Course in Algebraic
98 BRÖCKER/TOM DIECK. Representations of Topology.
Compact Lie Groups. 128 RAUCH. Partial Differential Equations.
99 GROVE/BENSON. Finite Reflection Groups. 129 FULTON/HARRIS. Representation Theory: A
2nd ed. First Course. Readings in Mathematics
100 BERG/CHRISTENSEN/RESSEL. Harmonic 130 DODSON/POSTON. Tensor Geometry.
Analysis on Semigroups: Theory of 131 LAM. A First Course in Noncommutative
Positive Definite and Related Functions. Rings. 2nd ed.
101 EDWARDS. Galois Theory. 132 BEARDON. Iteration of Rational Functions.
102 VARADARAJAN. Lie Groups, Lie Algebras 133 HARRIS. Algebraic Geometry: A First
and Their Representations. Course.
103 LANG. Complex Analysis. 3rd ed. 134 ROMAN. Coding and Information Theory.
104 DUBROVIN/FOMENKO/NOVIKOV. Modern 135 ROMAN. Advanced Linear Algebra. 3rd ed.
Geometry—Methods and Applications. 136 ADKINS/WEINTRAUB. Algebra: An Approach
Part II. via Module Theory.
105 LANG. SL 2 (R). 137 AXLER/BOURDON/RAMEY. Harmonic
106 SILVERMAN. The Arithmetic of Elliptic Function Theory. 2nd ed.
Curves.
By Frank Ganz at 12:24 pm, Jul 03, 2007
