| #203 |  A Course in Functional Analysis
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| #204 |  Linear Operators, Part 1: General Theory
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| #205 |  Fundamentals of the Theory of Operator Algebras, Volume I: Elementary Theory
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| #206 |  Introductory Functional Analysis with Applications Introductory Functional Analysis with Applications
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| #207 |  Essential Results of Functional Analysis
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| #208 |  Topics in Complex Analysis
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| #209 |  Analytic Functions of Several Complex Variables
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| #210 |  Compact Riemann Surfaces
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| #211 |  Compact Riemann Surfaces: An Introduction to Contemporary Mathematics
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| #212 |  The Concept of a Riemann Surface
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| #213 |  An Introduction to Harmonic Analysis
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| #214 |  Fourier Analysis on Groups
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| #215 |  Abstract Harmonic Analysis: Structure and Analysis for Compact Groups Analysis on Locally Compact Abelian Groups
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| #216 |  Introduction to Fourier Analysis on Euclidean Spaces.
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| #217 |  Groups and Geometric Analysis (Integral Geometry, Invariant Differential Operators and Spherical Functions).
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| #218 |  Partial Differential Equations I: Basic Theory
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| #219 |  The Analysis of Linear Partial Differential Operators I: Distribution Theory and Fourier Analysis
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| #220 |  Equivalence, Invariants and Symmetry
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| #221 |  Differential Topology
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| #222 |  Differential and Riemannian Manifolds
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| #223 |  Foundations of Differentiable Manifolds and Lie Groups
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| #224 |  Algebraic Topology: A First Course
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| #225 |  Differential Forms in Algebraic Topology
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| #226 |  Algebraic Topology
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| #227 |  An Introduction to Algebraic Topology
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| #228 |  Classical Topology and Combinatorial Group Theory
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| #229 |  Topology and Geometry
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| #230 |  Differential Geometry, Lie Groups, and Symmetric Spaces
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| #231 |  Foundations of Differential Geometry, Vol. 1
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| #232 |  The Laplacian on a Riemannian Manifold: An Introduction to Analysis on Manifolds
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| #233 |  Riemannian Geometry
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| #234 |  An Introduction to Differentiable Manifolds and Riemannian Geometry, Revised
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| #235 |  Geometric Measure Theory: A Beginner's Guide
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| #236 |  The Geometry of Fractal Sets
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| #237 |  Algebraic Geometry
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| #238 |  Basic Algebraic Geometry Volume 1: Varieties in Projective Space
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| #239 |  Algebraic Geometry I: Complex Projective Varieties
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| #240 |  Principles of Algebraic Geometry
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| #241 |  Algebraic Geometry
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| #242 |  Conceptual Mathematics
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| #243 |  Mathematics form and function
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| #244 |  A Panorama of Pure Mathematics, as Seen by N. Bourbaki
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| #245 |  Calculus Made Easy
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| #246 |  Mathematical Tools for Physics
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| #247 |  Complex Variables and Applications
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| #248 |  Complex Analysis
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| #249 |  Methods of Real Analysis
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| #250 |  Elements of Set Theory
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| #251 |  Sets for Mathematics
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| #252 |  Symmetry
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| #253 |  A course in mathematics for students of physics
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| #254 |  Mathematical physics
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| #255 |  Analysis, Manifolds and Physics, Part 1
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| #256 |  Group Theory and Physics
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| #257 |  Lie Groups for Physicists
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| #258 |  Unitary Group Representations in Physics, Probability, and Number Theory
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| #259 |  Lie Groups, Lie Algebras, and Representations: An Elementary Introduction
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| #260 |  Lectures on Lie Groups
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| #261 |  Lie Groups
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| #262 |  Topology, Geometry and Gauge Fields: Foundations
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| #263 |  MODERN DIFFERENTIAL GEOMETRY FOR PHYSICISTS
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| #264 |  Differential Forms with Applications to the Physical Sciences
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| #265 |  Topology and Geometry for Physicists
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| #266 |  Geometry, Topology and Physics
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| #267 |  Differential Topology and Quantum Field Theory
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| #268 |  Modern Geometry ― Methods and Applications: Part I: The Geometry of Surfaces, Transformation Groups, and Fields
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| #269 |  Modern Geometry― Methods and Applications: Part II: The Geometry and Topology of Manifolds
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| #270 |  Modern Geometry―Methods and Applications: Part III: Introduction to Homology Theory
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| #271 |  Algebraic Topology
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| #272 |  A Concise Course in Algebraic Topology
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| #273 |  On Knots.
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| #274 |  Knots and Physics
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| #275 |  Knots and Links Knots and Links
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| #276 |  Mathematical Methods of Classical Mechanics
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| #277 |  Methods of modern mathematical physics
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| #278 |  Fourier Analysis, Self-Adjointness
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| #279 |  Analysis of Operators
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| #280 |  Scattering Theory
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| #281 |  An Introduction to Homological Algebra
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| #282 |  Cryptonomicon
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| #283 |  Applied Combinatorics on Words
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| #284 |  Speed Mathematics Simplified
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| #285 |  To Mock a Mockingbird
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| #286 |  Logic: The Laws of Truth
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| #287 |  On Indivisible Lines On Indivisible Lines
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| #288 |  Vector Calculus, Linear Algebra, and Differential Forms: A Unified Approach
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| #289 |  A Book of Abstract Algebra
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| #290 |  Analysis I
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| #291 |  Analysis II
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| #292 |  Analysis III
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| #293 |  Mathematical Analysis I
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| #295 |  Fourier Analysis: An Introduction
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| #296 |  Complex Analysis
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| #297 |  Real Analysis
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| #298 |  Functional analysis
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| #299 |  Analysis I
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| #300 |  Analysis II
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| #301 |  An Introduction to Measure Theory
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| #302 |  Basic Real Analysis
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| #303 |  Advanced Real Analysis
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