Verfügbarkeit: The Riemann approach to integration

The Riemann approach to integration: local geometric theory

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Bibliographische Detailangaben
1. Verfasser:	Pfeffer, Washek F. (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Cambridge [u.a.] Cambridge Univ. Press 1993
Ausgabe:	1. publ.
Schriftenreihe:	Cambridge tracts in mathematics 109
Schlagworte:	Riemannsches Integral
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	XIV, 302 S.
ISBN:	0521440351

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MARC


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Datensatz im Suchindex

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adam_text	Contents Preface page xi Acknowledgments xv I One dimensional integration 1 Preliminaries 3 1.1 Lengths 4 1.2 Partitions 5 1.3 Stieltjes sums 7 2 The McShane integral 8 2.1 The integral 8 2.2 Absolute integrability 12 2.3 Convergence theorems 17 2.4 Connections with derivatives 24 2.5 Gap functions 30 2.6 Integration by parts 32 3 Measure and measurability 37 3.1 Extended real numbers 37 3.2 Measures 38 3.3 Measurable sets 44 3.4 Calculating measures 52 3.5 Negligible sets 55 3.6 Measurable functions 56 3.7 The a^ measure 60 4 Integrable functions 64 4.1 Integral and measure 64 4.2 Semicontinuous functions 69 4.3 The Perron test 71 4.4 Approximations 77 5 Descriptive definition 81 5.1 AC functions 81 5.2 Covering theorems 86 viii Contents 5.3 Differentiation 91 5.4 Singular functions 98 6 The Henstock Kurzweil integral 102 6.1 The P integral 102 6.2 Integration by parts 108 6.3 Connections with measures 111 6.4 AC* functions 115 6.5 Densities 118 6.6 Almost differentiable functions 120 6.7 Gages and calibers 124 II Multidimensional integration 7 Preliminaries 133 7.1 Intervals 134 7.2 Volumes 136 7.3 Partitions 139 7.4 Stieltjes sums 141 8 The McShane integral 143 8.1 The integral 143 8.2 Dirac volumes 146 8.3 The divergence theorem 148 8.4 Measures and measurability 153 8.5 The Perron test 158 8.6 The Fubini theorem 161 9 Descriptive definition 168 9.1 AC functions 168 9.2 Covering theorems 170 9.3 Derivability 174 10 Change of variables 180 10.1 Integrating over a set 180 10.2 Luzin maps 185 10.3 Lipschitz maps 188 10.4 The Rademacher theorem 193 10.5 The main formula 198 10.6 Almost differentiable maps 203 Contents be 11 The gage integral 207 11.1 A motivating example 207 11.2 Continuous additive functions 211 11.3 Gages and calibers 214 11.4 The g integral 218 11.5 Improper integrals 225 11.6 Connections with the McShane integral 228 11.7 Almost derivable functions 230 12 The ^ integral 239 12.1 Shape and regularity 239 12.2 The ^ integral 242 12.3 Derivability relative to T 246 12.4 Integration by parts 251 12.5 The quasi Hausdorff measure 253 12.6 Solids 258 12.7 Change of variables 261 12.8 Multipliers 265 13 Recent developments 273 13.1 The 5 integral 273 13.2 The perimeter 278 13.3 The flux 285 13.4 The £V integral 287 Bibliography 293 List of symbols 296 Index 299
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isbn	0521440351
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spelling	Pfeffer, Washek F. Verfasser aut The Riemann approach to integration local geometric theory Washek F. Pfeffer 1. publ. Cambridge [u.a.] Cambridge Univ. Press 1993 XIV, 302 S. txt rdacontent n rdamedia nc rdacarrier Cambridge tracts in mathematics 109 Riemannsches Integral (DE-588)4049996-0 gnd rswk-swf Riemannsches Integral (DE-588)4049996-0 s DE-604 Cambridge tracts in mathematics 109 (DE-604)BV000000001 109 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=006361628&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Pfeffer, Washek F. The Riemann approach to integration local geometric theory Cambridge tracts in mathematics Riemannsches Integral (DE-588)4049996-0 gnd
subject_GND	(DE-588)4049996-0
title	The Riemann approach to integration local geometric theory
title_auth	The Riemann approach to integration local geometric theory
title_exact_search	The Riemann approach to integration local geometric theory
title_full	The Riemann approach to integration local geometric theory Washek F. Pfeffer
title_fullStr	The Riemann approach to integration local geometric theory Washek F. Pfeffer
title_full_unstemmed	The Riemann approach to integration local geometric theory Washek F. Pfeffer
title_short	The Riemann approach to integration
title_sort	the riemann approach to integration local geometric theory
title_sub	local geometric theory
topic	Riemannsches Integral (DE-588)4049996-0 gnd
topic_facet	Riemannsches Integral
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