Verfügbarkeit: Integral representation theory

Integral representation theory: applications to convexity, Banach spaces and potential theory

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Bibliographische Detailangaben
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin [u.a.] de Gruyter 2010
Schriftenreihe:	De Gruyter studies in mathematics 35
Schlagworte:	Banach spaces Convex domains Functional analysis Integral representations Potential theory (Mathematics) Banach-Raum Choquet-Theorie Potenzialtheorie Konvexe Menge Integraldarstellung
Online-Zugang:	Inhaltstext Inhaltsverzeichnis
Beschreibung:	XVI, 715 S.
ISBN:	9783110203202

Internformat

MARC


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Datensatz im Suchindex

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adam_text	4.2 BARYCENTRIC THEOREM AND STRONGLY AFFINE FUNCTIONS 113 CONTENTS INTRODUCTION V 1 PROLOGUE 1 1.1 THE KOROVKIN THEOREM 1 1.2 NOTES AND COMMENTS 3 2 COMPACT CONVEX SETS 4 2.1 GEOMETRY OF CONVEX SETS 5 2.1 .A FINITE-DIMENSIONAL CASE 5 2.1.B THE KREIN-MILMAN THEOREM 9 2.1.C EXPOSED POINTS 21 2.2 INTERLUDE: ON THE SPACE M{K) 22 2.3 STRUCTURES IN CONVEX SETS 26 2.3.A EXTREMAL SETS AND FACES 26 2.3.B MEASURE CONVEX SETS 30 2.3.C MEASURE EXTREMAL SETS 36 2.4 EXERCISES 40 2.5 NOTES AND COMMENTS 49 3 CHOQUET THEORY OF FUNCTION SPACES 52 3.1 FUNCTION SPACES 53 3.2 MORE ABOUT KOROVKIN THEOREMS 64 3.3 ON THE W-BARYCENTER MAPPING 66 3.4 THE CHOQUET REPRESENTATION THEOREM 67 3.5 IN-BETWEEN THEOREMS 70 3.6 MAXIMAL MEASURES 73 3.7 BOUNDARIES AND THE SIMONS LEMMA 78 3.8 THE BISHOP-DE LEEUW THEOREM 81 3.9 MINIMUM PRINCIPLES 84 3.10 ORDERINGS AND DILATIONS 86 3.11 EXERCISES 95 3.12 NOTES AND COMMENTS 105 4 AFFINE FBNCTIONS ON COMPACT CONVEX SETS 107 4.1 AFFINE FUNCTIONS AND THE BARYCENTRIC FORMULA 107 BIBLIOGRAFISCHE INFORMATIONEN HTTP://D-NB.INFO/997086351 DIGITALISIERT DURCH . 4.3 STATE SPACE AND REPRESENTATION OF AFFINE FUNCTIONS 120 4.4 AFFINE BAIRE-ONE FUNCTIONS ON DUAL UNIT BALLS 127 4.5 EXERCISES 129 4.6 NOTES AND COMMENTS 133 PERFECT CLASSES OF FUNCTIONS AND REPRESENTATION OF AFFINE FUNCTIONS 135 5.1 GENERATION OF SETS AND FUNCTIONS 136 5.2 BAIRE AND BOREL SETS 142 5.3 BAIRE AND BOREL MAPPINGS 146 5.4 PERFECT CLASSES OF FUNCTIONS 149 5.5 AFFINELY PERFECT CLASSES OF FUNCTIONS 150 5.6 REPRESENTATION OF %-AFFINE FUNCTIONS 154 5.7 EXERCISES 159 5.8 NOTES AND COMMENTS 166 SIMPLICIAL FUNCTION SPACES 168 6.1 BASIC PROPERTIES OF SIMPLICIAL SPACES 169 6.2 CHARACTERIZATIONS OF SIMPLICIAL SPACES 176 6.3 SIMPLICIAL SPACES AS L'-PREDUALS 178 6.4 THE WEAK DIRICHLET PROBLEM AND *4 C (%)-EXPOSED POINTS 180 6.5 THE DIRICHLET PROBLEM FOR A SINGLE FUNCTION 182 6.6 SPECIAL CLASSES OF SIMPLICIAL SPACES 185 6.6.A BAUER SIMPLICIAL SPACES 185 6.6.B MARKOV SIMPLICIAL SPACES 188 6.6.C SIMPLICIAL SPACES WITH LINDELOEF BOUNDARIES 190 6.6.D SIMPLICIAL SPACES WITH BOUNDARIES OF TYPE F A 192 6.7 THE DAUGAVET PROPERTY OF SIMPLICIAL SPACES 196 6.8 CHOQUET SIMPLICES 198 6.8.A SIMPLICIAL FUNCTION SPACES AND THE CLASSICAL DEFINITION OF CHOQUET SIMPLICES 198 6.8.B PRIME FUNCTION SPACES AND PRIME COMPACT CONVEX SETS . . 7.5 ORDERED COMPACT CONVEX SETS AND SIMPLICIAL MEASURES 232 7.6 EXERCISES 240 7.7 NOTES AND COMMENTS 243 8 CHOQUET-LIKE SETS 244 8.1 SPLIT AND PARALLEL FACES 244 8.2 H -EXTREMAL AND %-CONVEX SETS 246 8.3 CHOQUET SETS, M-SETS AND P-SETS 250 8.4 %-EXPOSED SETS 257 8.5 WEAK TOPOLOGY ON BOUNDARY MEASURES 259 8.6 CHARACTERIZATIONS OF SIMPLICIALITY BY CHOQUET SETS 262 8.7 EXERCISES 268 8.8 NOTES AND COMMENTS 273 9 TOPOLOGIES ON BOUNDARIES 274 9.1 TOPOLOGIES GENERATED BY EXTREMAL SETS 274 9.2 INDUCED MEASURES ON CHOQUET BOUNDARIES 278 9.3 FUNCTIONS CONTINUOUS IN A EN AND CR MAX TOPOLOGIES 284 9.4 STRONGLY UNIVERSALLY MEASURABLE FUNCTIONS 288 9.5 FACIAL TOPOLOGY GENERATED BY M-SETS 296 9.6 EXERCISES 303 9.7 NOTES AND COMMENTS 308 10 DEEPER RESULTS ON FUNCTION SPACES AND COMPACT CONVEX SETS 310 10.1 BOUNDARIES 311 10.1.A SHILOV BOUNDARY 311 10.1.B BOUNDARIES IN BANACH SPACES 314 10.2 ISOMETRIES OF SPACES OF AFFINE CONTINUOUS FUNCTIONS 320 10.3 BAIRE MEASURABILITY AND BOUNDEDNESS OF AFFINE FUNCTIONS 323 10.3.A THE CANTOR SET AND ITS PROPERTIES 323 10.3.B AUTOMATIC BOUNDEDNESS OF AFFINE AND CONVEX FUNCTIONS . . . . 328 10.4 EMBEDDINGOR 1 335 10.5 METRIZABILITY OF COMPACT CONVEX SETS 338 10. 10.10 EXERCISES 378 10.11 NOTES AND COMMENTS 384 11 CONTINUOUS AND MEASURABLE SELECTORS 389 11.1 THE LAZAR SELECTION THEOREM 389 11.2 APPLICATIONS OF THE LAZAR SELECTION THEOREM 394 11.3 THE WEAK DIRICHLET PROBLEM FOR BAIRE FUNCTIONS 398 11.4 POINTWISE APPROXIMATION OF MAXIMAL MEASURES 400 11.5 MEASURABLE SELECTORS 402 11.5.A MULTIVALUED MAPPINGS 402 11.5.B SELECTION THEOREM 406 11.5.C APPLICATIONS OF THE SELECTION THEOREM 409 11.6 EXERCISES 412 11.7 NOTES AND COMMENTS 416 12 CONSTRUCTIONS OF FUNCTION SPACES 419 12.1 PRODUCTS OF FUNCTION SPACES 420 12.1.A DEFINITIONS AND BASIC PROPERTIES 420 12.1.B MAXIMAL MEASURES AND EXTREMAL SETS 424 12.1 .C PARTITIONS OF UNITY AND APPROXIMATION IN PRODUCTS OF FUNCTION SPACES 428 12.1.D PRODUCTS OF SIMPLICIAL SPACES 436 12.2 INVERSE LIMITS OF FUNCTION SPACES 440 12.2.A ADMISSIBLE MAPPINGS 440 12.2.B CONSTRUCTION OF INVERSE LIMITS 442 12.2.C INVERSE LIMITS OF SIMPLICIAL FUNCTION SPACES 445 12.2.D STRUCTURE OF SIMPLICES 447 12.3 SEVERAL EXAMPLES 455 12.3.A THE POULSEN SIMPLEX 455 12.3.B A BIG SIMPLICIAL SPACE 465 12.3.C FUNCTIONS OF AFFINE CLASSES AND TALAGRAND'S EXAMPLE 470 12.4 EXERCISES 477 12.5 NOTES AND COMMENTS 486 13 FUNCTION SPACES IN POTENTIAL THEORY AND THE DIRICHLET PROBLEM 489 13.1 BALAYAGE AND THE DIRICHLET PROBLEM . 491 13.1. 13.3.B FUNCTION SPACES AND CONES IN PARABOLIC POTENTIAL THEORY AND HARMONIC SPACES 510 13.3.C CONTINUITY PROPERTIESOF H(C/)-CONCAVE FUNCTIONS 513 13.3.D SEPARATION BY FUNCTIONS FROM H(/) 515 13.4 DIRICHLET PROBLEM: SOLUTION METHODS 517 13.4.A PWB SOLUTION OF THE DIRICHLET PROBLEM 518 13.4.B CORNEA'S APPROACH TO THE DIRICHLET PROBLEM 523 13.4.C THE WIENER SOLUTION 530 13.4.D FINE WIENER SOLUTION 532 13.4.E PDE SOLUTIONS IN SOBOLEV SPACES 534 13.5 GENERALIZED DIRICHLET PROBLEM AND UNIQUENESS QUESTIONS 537 13.5.A LATTICE APPROACH 538 13.5.B UNIQUENESS FOR THE LAPLACE EQUATION 540 13.5.C KELDYSH THEOREMS IN PARABOLIC AND AXIOMATIC POTENTIAL THEORIES 542 13.6 EXERCISES 546 13.7 NOTES AND COMMENTS 555 14 APPLICATIONS 563 14.1 REPRESENTATION OF CONVEX FUNCTIONS 564 14.2 REPRESENTATION OF CONCAVE FUNCTIONS 567 14.3 DOUBLY STOCHASTIC MATRICES 572 14.4 THE RIESZ-HERGLOTZ THEOREM 573 14.5 TYPICALLY REAL HOLOMORPHIC FUNCTIONS 575 14.6 HOLOMORPHIC FUNCTIONS WITH POSITIVE REAL PART 580 14.7 COMPLETELY MONOTONIC FUNCTIONS 586 14.8 POSITIVE DEFINITE FUNCTIONS ON DISCRETE GROUPS 589 14.9 RANGE OF VECTOR MEASURES 593 14.10THESTONE-WEIERSTRASS APPROXIMATION THEOREM 595 14.11 INVARIANT AND ERGODIC MEASURES 597 14.12 EXERCISES 603 14.13 NOTES AND COMMENTS 605 A APPENDIX 608 A.1 FUNCTIONAL ANALYSIS 608 A.L. A.3 MEASURE THEORY 624 A.3.A MEASURE SPACES 624 A.3.B RADON MEASURES ON LOCALLY COMPACT CR-COMPACT SPACES . . . . 626 A.3.C IMAGES, PRODUCTS AND INVERSE LIMITS OF RADON MEASURES . . . . 632 A.3.D KERNELS AND DISINTEGRATION OF MEASURES 636 A.4 DESCRIPTIVE SET THEORY 637 A.5 RESOLVABLE SETS AND BAIRE-ONE FUNCTIONS 640 A.6 THE LAPLACE EQUATION 645 A.6.A WEAK SOLUTIONS OF THE LAPLACE EQUATION 647 A.7 THE HEAT EQUATION 649 A.8 AXIOMATIC POTENTIAL THEORY 652 A.8.A BAUER'S AXIOMATIC THEORY 653 A.8.B HYPERHARMONIC AND SUPERHARMONIC FUNCTIONS 654 A.8.C POTENTIALS 656 A.8.D SUPERHARMONIC FUNCTIONS AND GREEN POTENTIALS 657 A.8.E SUPERHARMONIC FUNCTIONS AND POTENTIALS FOR THE HEAT EQUATION . 660 A.8.F BALAYAGE 661 A.8.G THINNESS, BASE AND FINE TOPOLOGY 663 A.8.H POLAR AND SEMIPOLAR SETS 665 BIBLIOGRAPHY 669 LIST OF SYMBOLS 695 INDEX 703
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spelling	Integral representation theory applications to convexity, Banach spaces and potential theory Jaroslav Lukeš ... Berlin [u.a.] de Gruyter 2010 XVI, 715 S. txt rdacontent n rdamedia nc rdacarrier De Gruyter studies in mathematics 35 Banach spaces Convex domains Functional analysis Integral representations Potential theory (Mathematics) Banach-Raum (DE-588)4004402-6 gnd rswk-swf Choquet-Theorie (DE-588)4638875-8 gnd rswk-swf Potenzialtheorie (DE-588)4046939-6 gnd rswk-swf Konvexe Menge (DE-588)4165212-5 gnd rswk-swf Integraldarstellung (DE-588)4127585-8 gnd rswk-swf Integraldarstellung (DE-588)4127585-8 s Konvexe Menge (DE-588)4165212-5 s Banach-Raum (DE-588)4004402-6 s Potenzialtheorie (DE-588)4046939-6 s DE-604 Choquet-Theorie (DE-588)4638875-8 s Lukeš, Jaroslav 1940- Sonstige (DE-588)111006066 oth De Gruyter studies in mathematics 35 (DE-604)BV000005407 35 text/html http://deposit.dnb.de/cgi-bin/dokserv?id=3360094&prov=M&dok_var=1&dok_ext=htm Inhaltstext DNB Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=018677562&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Integral representation theory applications to convexity, Banach spaces and potential theory De Gruyter studies in mathematics Banach spaces Convex domains Functional analysis Integral representations Potential theory (Mathematics) Banach-Raum (DE-588)4004402-6 gnd Choquet-Theorie (DE-588)4638875-8 gnd Potenzialtheorie (DE-588)4046939-6 gnd Konvexe Menge (DE-588)4165212-5 gnd Integraldarstellung (DE-588)4127585-8 gnd
subject_GND	(DE-588)4004402-6 (DE-588)4638875-8 (DE-588)4046939-6 (DE-588)4165212-5 (DE-588)4127585-8
title	Integral representation theory applications to convexity, Banach spaces and potential theory
title_auth	Integral representation theory applications to convexity, Banach spaces and potential theory
title_exact_search	Integral representation theory applications to convexity, Banach spaces and potential theory
title_full	Integral representation theory applications to convexity, Banach spaces and potential theory Jaroslav Lukeš ...
title_fullStr	Integral representation theory applications to convexity, Banach spaces and potential theory Jaroslav Lukeš ...
title_full_unstemmed	Integral representation theory applications to convexity, Banach spaces and potential theory Jaroslav Lukeš ...
title_short	Integral representation theory
title_sort	integral representation theory applications to convexity banach spaces and potential theory
title_sub	applications to convexity, Banach spaces and potential theory
topic	Banach spaces Convex domains Functional analysis Integral representations Potential theory (Mathematics) Banach-Raum (DE-588)4004402-6 gnd Choquet-Theorie (DE-588)4638875-8 gnd Potenzialtheorie (DE-588)4046939-6 gnd Konvexe Menge (DE-588)4165212-5 gnd Integraldarstellung (DE-588)4127585-8 gnd
topic_facet	Banach spaces Convex domains Functional analysis Integral representations Potential theory (Mathematics) Banach-Raum Choquet-Theorie Potenzialtheorie Konvexe Menge Integraldarstellung
url	http://deposit.dnb.de/cgi-bin/dokserv?id=3360094&prov=M&dok_var=1&dok_ext=htm http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=018677562&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000005407
work_keys_str_mv	AT lukesjaroslav integralrepresentationtheoryapplicationstoconvexitybanachspacesandpotentialtheory

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