Page 540 - Advanced Linear Algebra
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138 COHEN. A Course in Computational 175 LICKORISH. An Introduction to Knot Theory.
Algebraic Number Theory. 176 LEE. Riemannian Manifolds.
139 BREDON. Topology and Geometry. 177 NEWMAN. Analytic Number Theory.
140 AUBIN. Optima and Equilibria. An 178 CLARKE/LEDYAEV/STERN/WOLENSKI.
Introduction to Nonlinear Analysis. Nonsmooth Analysis and Control Theory.
141 BECKER/WEISPFENNING/KREDEL. Gröbner 179 DOUGLAS. Banach Algebra Techniques in
Bases. A Computational Approach to Operator Theory. 2nd ed.
Commutative Algebra. 180 SRIVASTAVA. A Course on Borel Sets.
142 LANG. Real and Functional Analysis. 3rd ed. 181 KRESS. Numerical Analysis.
143 DOOB. Measure Theory. 182 WALTER. Ordinary Differential Equations.
144 DENNIS/FARB. Noncommutative Algebra. 183 MEGGINSON. An Introduction to Banach
145 VICK. Homology Theory. An Introduction Space Theory.
to Algebraic Topology. 2nd ed. 184 BOLLOBAS. Modern Graph Theory.
146 BRIDGES. Computability: A Mathematical 185 COX/LITTLE/O’SHEA. Using Algebraic
Sketchbook. Geometry. 2nd ed.
147 ROSENBERG. Algebraic K-Theory and Its 186 RAMAKRISHNAN/VALENZA. Fourier Analysis
Applications. on Number Fields.
148 ROTMAN. An Introduction to the Theory of 187 HARRIS/MORRISON. Moduli of Curves.
Groups. 4th ed. 188 GOLDBLATT. Lectures on the Hyperreals: An
149 RATCLIFFE. Foundations of Hyperbolic Introduction to Nonstandard Analysis.
Manifolds. 2nd ed. 189 LAM. Lectures on Modules and Rings.
150 EISENBUD. Commutative Algebra with a 190 ESMONDE/MURTY. Problems in Algebraic
View Toward Algebraic Geometry. Number Theory. 2nd ed.
151 SILVERMAN. Advanced Topics in the 191 LANG. Fundamentals of Differential
Arithmetic of Elliptic Curves. Geometry.
152 ZIEGLER. Lectures on Polytopes. 192 HIRSCH/LACOMBE. Elements of Functional
153 FULTON. Algebraic Topology: A First Analysis.
Course. 193 COHEN. Advanced Topics in Computational
154 BROWN/PEARCY. An Introduction to Number Theory.
Analysis. 194 ENGEL/NAGEL. One-Parameter Semigroups
155 KASSEL. Quantum Groups. for Linear Evolution Equations.
156 KECHRIS. Classical Descriptive Set Theory. 195 NATHANSON. Elementary Methods in
157 MALLIAVIN. Integration and Probability. Number Theory.
158 ROMAN. Field Theory. 196 OSBORNE. Basic Homological Algebra.
159 CONWAY. Functions of One Complex 197 EISENBUD/HARRIS. The Geometry of
Variable II. Schemes.
160 LANG. Differential and Riemannian 198 ROBERT. A Course in p-adic Analysis.
Manifolds. 199 HEDENMALM/KORENBLUM/ZHU. Theory of
161 BORWEIN/ERDÉLYI. Polynomials and Bergman Spaces.
Polynomial Inequalities. 200 BAO/CHERN/SHEN. An Introduction to
162 ALPERIN/BELL. Groups and Representations. Riemann–Finsler Geometry.
163 DIXON/MORTIMER. Permutation Groups. 201 HINDRY/SILVERMAN. Diophantine Geometry:
164 NATHANSON. Additive Number Theory: The An Introduction.
Classical Bases. 202 LEE. Introduction to Topological Manifolds.
165 NATHANSON. Additive Number Theory: 203 SAGAN. The Symmetric Group:
Inverse Problems and the Geometry of Representations, Combinatorial
Sumsets. Algorithms, and Symmetric Functions.
166 SHARPE. Differential Geometry: Cartan’s 204 ESCOFIER. Galois Theory.
Generalization of Klein’s Erlangen 205 FÉLIX/HALPERIN/THOMAS. Rational
Program. Homotopy Theory. 3rd ed.
167 MORANDI. Field and Galois Theory. 206 MURTY. Problems in Analytic Number
168 EWALD. Combinatorial Convexity and Theory. Readings in Mathematics
Algebraic Geometry. 207 GODSIL/ROYLE. Algebraic Graph Theory.
169 BHATIA. Matrix Analysis. 208 CHENEY. Analysis for Applied Mathematics.
170 BREDON. Sheaf Theory. 2nd ed. 209 ARVESON. A Short Course on Spectral
171 PETERSEN. Riemannian Geometry. 2nd ed. Theory.
172 REMMERT. Classical Topics in Complex 210 ROSEN. Number Theory in Function Fields.
Function Theory. 211 LANG. Algebra. Revised 3rd ed.
173 DIESTEL. Graph Theory. 2nd ed. 212 MATOUŠEK. Lectures on Discrete Geometry.
174 BRIDGES. Foundations of Real and Abstract 213 FRITZSCHE/GRAUERT. From Holomorphic
Analysis. Functions to Complex Manifolds.
