| Preface to the third edition | p. vii |
| A foreword to the practical | p. xix |
| Odds and ends | p. 1 |
| Numbers | p. 1 |
| Sets | p. 2 |
| Relations, correspondences, and functions | p. 4 |
| A bestiary of relations | p. 5 |
| Equivalence relations | p. 7 |
| Orders and such | p. 7 |
| Real functions | p. 8 |
| Duality of evaluation | p. 9 |
| Infinities | p. 10 |
| The Diagonal Theorem and Russell's Paradox | p. 12 |
| The axiom of choice and axiomatic set theory | p. 13 |
| Zorn's Lemma | p. 15 |
| Ordinals | p. 18 |
| Topology | p. 21 |
| Topological spaces | p. 23 |
| Neighborhoods and closures | p. 26 |
| Dense subsets | p. 28 |
| Nets | p. 29 |
| Filters | p. 32 |
| Nets and Filters | p. 35 |
| Continuous functions | p. 36 |
| Compactness | p. 38 |
| Nets vs. sequences | p. 41 |
| Semicontinuous functions | p. 43 |
| Separation properties | p. 44 |
| Comparing topologies | p. 47 |
| Weak topologies | p. 47 |
| The product topology | p. 50 |
| Pointwise and uniform convergence | p. 53 |
| Locally compact spaces | p. 55 |
| The Stone-&Cbreve;ech compactification | p. 58 |
| Stone-&Cbreve;ech compactification of a discrete set | p. 63 |
| Paracompact spaces and partitions of unity | p. 65 |
| Metrizable spaces | p. 69 |
| Metric spaces | p. 70 |
| Completeness | p. 73 |
| Uniformly continuous functions | p. 76 |
| Semicontinuous functions on metric spaces | p. 79 |
| Distance functions | p. 80 |
| Embeddings and completions | p. 84 |
| Compactness and completeness | p. 85 |
| Countable products of metric spaces | p. 89 |
| The Hilbert cube and metrization | p. 90 |
| Locally compact metrizable spaces | p. 92 |
| The Baire Category Theorem | p. 93 |
| Contraction mappings | p. 95 |
| The Cantor set | p. 98 |
| The Baire space <$>{op N}^{op N}<$> | p. 101 |
| Uniformities | p. 108 |
| The Hausdorff distance | p. 109 |
| The Hausdorff metric topology | p. 113 |
| Topologies for spaces of subsets | p. 119 |
| The space C(X, Y) | p. 123 |
| Measurability | p. 127 |
| Algebras of sets | p. 129 |
| Rings and semirings of sets | p. 131 |
| Dynkin's lemma | p. 135 |
| The Borel -algebra | p. 137 |
| Measurable functions | p. 139 |
| The space of measurable functions | p. 141 |
| Simple functions | p. 144 |
| The -algebra induced by a function | p. 147 |
| Product structures | p. 148 |
| Carathéodory functions | p. 153 |
| Borel functions and continuity | p. 156 |
| The Baire -algebra | p. 158 |
| Topological vector spaces | p. 163 |
| Linear topologies | p. 166 |
| Absorbing and circled sets | p. 168 |
| Metrizable topological vector spaces | p. 172 |
| The Open Mapping and Closed Graph Theorems | p. 175 |
| Finite dimensional topological vector spaces | p. 177 |
| Convex sets | p. 181 |
| Convex and concave functions | p. 186 |
| Sublinear functions and gauges | p. 190 |
| The Hahn-Banach Extension Theorem | p. 195 |
| Separating hyperplane theorems | p. 197 |
| Separation by continuous functionals | p. 201 |
| Locally convex spaces and seminorms | p. 204 |
| Separation in locally convex spaces | p. 207 |
| Dual pairs | p. 211 |
| Topologies consistent with a given dual | p. 213 |
| Polars | p. 215 |
| G-topologies | p. 220 |
| The Mackey topology | p. 223 |
| The strong topology | p. 223 |
| Normed spaces | p. 225 |
| Normed and Banach spaces | p. 227 |
| Linear operators on normed spaces | p. 229 |
| The norm dual of a normed space | p. 230 |
| The uniform boundedness principle | p. 232 |
| Weak topologies on normed spaces | p. 235 |
| Metrizability of weak topologies | p. 237 |
| Continuity of the evaluation | p. 241 |
| Adjoint operators | p. 243 |
| Projections and the fixed space of an operator | p. 244 |
| Hilbert spaces | p. 246 |
| Convexity | p. 251 |
| Extended-valued convex functions | p. 254 |
| Lower semicontinuous convex functions | p. 255 |
| Support points | p. 258 |
| Subgradients | p. 264 |
| Supporting hyperplanes and cones | p. 268 |
| Convex functions on finite dimensional spaces | p. 271 |
| Separation and support in finite dimensional spaces | p. 275 |
| Supporting convex subsets of Hilbert spaces | p. 280 |
| The Bishop-Phelps Theorem | p. 281 |
| Support functionals | p. 288 |
| Support functionals and the Hausdorff metric | p. 292 |
| Extreme points of convex sets | p. 294 |
| Quasiconvexity | p. 299 |
| Polytopes and weak neighborhoods | p. 300 |
| Exposed points of convex sets | p. 305 |
| Riesz spaces | p. 311 |
| Orders, lattices, and cones | p. 312 |
| Riesz spaces | p. 313 |
| Order bounded sets | p. 315 |
| Order and lattice properties | p. 316 |
| The Riesz decomposition property | p. 319 |
| Disjointness | p. 320 |
| Riesz subspaces and ideals | p. 321 |
| Order convergence and order continuity | p. 322 |
| Bands | p. 324 |
| Positive functionals | p. 325 |
| Extending positive functionals | p. 330 |
| Positive operators | p. 332 |
| Topological Riesz spaces | p. 334 |
| The band generated by E' | p. 339 |
| Riesz pairs | p. 340 |
| Symmetric Riesz pairs | p. 342 |
| Banach lattices | p. 347 |
| Fréchet and Banach lattices | p. 348 |
| The Stone-Weierstrass Theorem | p. 352 |
| Lattice homomorphisms and isometries | p. 353 |
| Order continuous norms | p. 355 |
| AM- and AL-spaces | p. 357 |
| The interior of the positive cone | p. 362 |
| Positive projections | p. 364 |
| The curious AL-space BV0 | p. 365 |
| Charges and measures | p. 371 |
| Set functions | p. 374 |
| Limits of sequences of measures | p. 379 |
| Outer measures and measurable sets | p. 379 |
| The Carathéodory extension of a measure | p. 381 |
| Measure spaces | p. 387 |
| Lebesgue measure | p. 389 |
| Product measures | p. 391 |
| Measures on <$>{op R}Prime<$> | p. 392 |
| Atoms | p. 395 |
| The AL-space of charges | p. 396 |
| The AL-space of measures | p. 399 |
| Absolute continuity | p. 401 |
| Integrals | p. 403 |
| The integral of a step function | p. 404 |
| Finitely additive integration of bounded functions | p. 406 |
| The Lebesgue integral | p. 408 |
| Continuity properties of the Lebesgue integral | p. 413 |
| The extended Lebesgue integral | p. 416 |
| Iterated integrals | p. 418 |
| The Riemann integral | p. 419 |
| The Bochner integral | p. 422 |
| The Gelfand integral | p. 428 |
| The Dunford and Pettis integrals | p. 431 |
| Measures and topology | p. 433 |
| Borel measures and regularity | p. 434 |
| Regular Borel measures | p. 438 |
| The support of a measure | p. 441 |
| Nonatomic Borel measures | p. 443 |
| Analytic sets | p. 446 |
| The Choquet Capacity Theorem | p. 456 |
| Lp-spaces | p. 461 |
| Lp-norms | p. 462 |
| Inequalities of Hölder and Minkowski | p. 463 |
| Dense subspaces of Lp-spaces | p. 466 |
| Sublattices of Lp-spaces | p. 467 |
| Separable L1-spaces and measures | p. 468 |
| The Radon-Nikodym Theorem | p. 469 |
| Equivalent measures | p. 471 |
| Duals of Lp-spaces | p. 473 |
| Lyapunov's Convexity Theorem | p. 475 |
| Convergence in measure | p. 479 |
| Convergence in measure in Lp-spaces | p. 481 |
| Change of variables | p. 483 |
| Riesz Representation Theorems | p. 487 |
| The AM-space Bb() and its dual | p. 488 |
| The dual of Cb(X) for normal spaces | p. 491 |
| The dual of Cc(X) for locally compact spaces | p. 496 |
| Baire vs. Borel measures | p. 498 |
| Homomorphisms between C(X)-spaces | p. 500 |
| Probability measures | p. 505 |
| The weak* topology on <$>cal {P} (X)<$> | p. 506 |
| Embedding X in <$>cal {P} (X)<$> | p. 512 |
| Properties of <$>cal {P} (X)<$> | p. 513 |
| The many faces of <$>cal {P} (X)<$> | p. 517 |
| Compactness in <$>cal {P} (X)<$> | p. 518 |
| The Kolmogorov Extension Theorem | p. 519 |
| Spaces of sequences | p. 525 |
| The basic sequence spaces | p. 526 |
| The sequence spaces <$>{op R}^{op N}<$> and ϕ | p. 527 |
| The sequence spaces c0 | p. 529 |
| The sequence space c | p. 531 |
| The <$>ell_p<$>-spaces | p. 533 |
| <$>ell_1<$> and the symmetric Riesz pair <$>langle ell_infty, ell_1 rangle<$> | p. 537 |
| The sequence space <$>ell_infty<$> | p. 538 |
| More on <$>ell_inftyprime = ba({op N})<$> | p. 543 |
| Embedding sequence spaces | p. 546 |
| Banach-Mazur limits and invariant measures | p. 550 |
| Sequences of vector spaces | p. 552 |
| Correspondences | p. 555 |
| Basic definitions | p. 556 |
| Continuity of correspondences | p. 558 |
| Hemicontinuity and nets | p. 563 |
| Operations on correspondences | p. 566 |
| The Maximum Theorem | p. 569 |
| Vector-valued correspondences | p. 571 |
| Demicontinuous correspondences | p. 574 |
| Knaster-Kuratowski-Mazurkiewicz mappings | p. 577 |
| Fixed point theorems | p. 581 |
| Contraction correspondences | p. 585 |
| Continuous selectors | p. 587 |
| Measurable correspondences | p. 591 |
| Measurability notions | p. 592 |
| Compact-valued correspondences as functions | p. 597 |
| Measurable selectors | p. 600 |
| Correspondences with measurable graph | p. 606 |
| Correspondences with compact convex values | p. 609 |
| Integration of correspondences | p. 614 |
| Markov transitions | p. 621 |
| Markov and stochastic operators | p. 623 |
| Markov transitions and kernels | p. 625 |
| Continuous Markov transitions | p. 631 |
| Invariant measures | p. 631 |
| Ergodic measures | p. 636 |
| Markov transition correspondences | p. 638 |
| Random functions | p. 641 |
| Dilations | p. 645 |
| More on Markov operators | p. 650 |
| A note on dynamical systems | p. 652 |
| Ergodicity | p. 655 |
| Measure-preserving transformations and ergodicity | p. 656 |
| Birkhoff's Ergodic Theorem | p. 659 |
| Ergodic operators | p. 661 |
| References | p. 667 |
| Index | p. 681 |
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