Verfügbarkeit: Stochastic geometry and its applications

Stochastic geometry and its applications:

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Bibliographische Detailangaben
Hauptverfasser:	Chiu, Sung Nok (VerfasserIn), Stoyan, Dietrich 1940- (VerfasserIn), Kendall, Wilfrid S. (VerfasserIn), Mecke, Joseph 1938- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Chichester, West Sussex, PO19 8SQ, United Kingdom Wiley 2013
Ausgabe:	Third edition
Schriftenreihe:	Wiley series in probability and statistics
Schlagworte:	Stochastic geometry Anwendung Stochastische Geometrie Stochastischer Prozess Geometrie
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Bis 2. Auflage unter dem Titel: Stoyan, Dietrich: Stochastic geometry and its applications
Beschreibung:	XXVI, 544 Seiten Illustrationen, Diagramme
ISBN:	9780470664810

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Datensatz im Suchindex

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adam_text	Titel: Stochastic geometry and its applications Autor: Chiu, Sung Nok Jahr: 2013 Contents Foreword to the first edition xiii From the preface to the first edition xvii Preface to the second edition xix Preface to the third edition xxi Notation xxiii 1 Mathematical foundations 1 1.1 Set theory 1 1.2 Topology in Euclidean spaces 3 1.3 Operations on subsets of Euclidean space 5 1.4 Mathematical morphology and image analysis 7 1.5 Euclidean isometries 9 1.6 Convex sets in Euclidean spaces 10 1.7 Functions describing convex sets 17 1.7.1 General 17 1.7.2 Set covariance 17 1.7.3 Chord length distribution 20 1.7.4 Erosion-dilation functions 24 1.8 Polyconvex sets 24 1.9 Measure and integration theory 27 Point processes I - The Poisson point process 35 2.1 Introduction 35 2.2 The binomial point process 36 2.2.1 Introduction 36 2.2.2 Basic properties 37 2.2.3 Simulation 38 2.3 The homogeneous Poisson point process 41 2.3.1 Definition and defining properties 41 2.3.2 Characterisation of the homogeneous Poisson point process 43 2.3.3 Moments and moment measures 44 2.3.4 The Palm distribution of a homogeneous Poisson point process 48 2.4 The inhomogeneous and general Poisson point process 51 2.5 Simulation of Poisson point processes 53 2.5.1 Simulation of a homogeneous Poisson point process 53 2.5.2 Simulation of an inhomogeneous Poisson point process 54 2.6 Statistics for the homogeneous Poisson point process 55 2.6.1 Introduction 55 2.6.2 Estimating the intensity 55 2.6.3 Testing the hypothesis of homogeneity 56 2.6.4 Testing the Poisson process hypothesis 56 3 Random closed sets I - The Boolean model 64 3.1 Introduction and basic properties 64 3.1.1 Model description 64 3.1.2 Applications 66 3.1.3 Stationarity and isotropy 69 3.1.4 Simulation 71 3.1.5 The capacity functional 71 3.1.6 Basic characteristics 73 3.1.7 Contact distribution functions 76 3.2 The Boolean model with convex grains 78 3.2.1 The simplified formula for the capacity functional 78 3.2.2 Intensities or densities of intrinsic volumes 79 3.2.3 Contact distribution functions 81 3.2.4 Morphological functions 84 3.2.5 Intersections with linear subspaces 84 3.2.6 Formulae for some special Boolean models with isotropic convex grains 87 3.3 Coverage and connectivity 89 3.3.1 Coverage probabilities 89 3.3.2 Clumps 91 3.3.3 Connectivity 91 3.3.4 Percolation 92 3.3.5 Vacant regions 94 3.4 Statistics 95 3.4.1 General remarks 95 3.4.2 Testing model assumptions 96 3.4.3 Estimation of model parameters 98 3.5 Generalisations and variations 103 3.6 Hints for practical applications 106 Point processes II - General theory 108 4.1 Basic properties 108 4.1.1 Introduction 108 4.1.2 The distribution of a point process 110 4.1.3 Notation 110 4.1.4 Stationarity and isotropy 112 4.1.5 Intensity measure and intensity 112 4.1.6 Ergodicity and central limit theorem 114 4.1.7 Contact distributions 115 4.2 Marked point processes 116 4.2.1 Fundamentals 116 4.2.2 Intensity and mark distribution 118 4.3 Moment measures and related quantities 120 4.3.1 Moment measures 120 4.3.2 Factorial moment measures 121 4.3.3 Product densities 122 4.3.4 The Campbell measure 123 4.3.5 The mark correlation function 123 4.3.6 The probability generating functional 125 4.4 Palm distributions 127 4.4.1 Heuristic introduction 127 4.4.2 The Palm distribution: First definition 129 4.4.3 The Palm distribution: Second definition 130 4.4.4 Reduced Palm distributions 131 4.4.5 Isotropy of Palm distribution 133 4.4.6 Inversion formulae 134 4.4.7 n-fold Palm distributions 134 4.4.8 Palm distributions for marked point processes 134 4.4.9 Point-stationarity 136 4.4.10 Stationary and balanced partitions 137 4.5 The second moment measure 139 4.6 Summary characteristics 143 4.7 Introduction to statistics for stationary spatial point processes 145 4.7.1 General remarks 145 4.7.2 Edge-corrections 145 4.7.3 Estimation of the intensity A 147 4.7.4 Estimation of the reduced second moment measure 148 4.7.5 Estimation of the spherical contact distribution and of the probability generating functional 150 4.7.6 Estimation of the nearest-neighbour distance distribution function 151 4.7.7 Estimation of Palm characteristics and mark distributions 152 4.7.8 Parameter estimation 153 4.7.9 Representative windows, representative volume elements 154 4.7.10 Hypotheses testing 155 4.8 General point processes 156 Point processes III - Models 158 5.1 Operations on point processes 158 5.2 Doubly stochastic Poisson processes (Cox processes) 166 5.2.1 Introduction 166 5.2.2 Examples of Cox processes 166 5.2.3 Formulae for characteristics of Cox processes 168 5.3 Neyman-Scott processes 171 5.4 Hard-core point processes 176 5.5 Gibbs point processes 178 5.5.1 Introduction 178 5.5.2 Gibbs point processes in bounded regions 180 5.5.3 Stationary Gibbs point processes 186 5.5.4 Spatial birth-and-death processes 192 5.5.5 Simulation of stationary Gibbs processes 194 5.6 Shot-noise fields 200 5.6.1 Definition and examples 200 5.6.2 Moment formulae for stationary shot-noise fields 202 Random closed sets II - The general case 205 6.1 Basic properties 205 6.1.1 Introduction 205 6.1.2 Random set definition 206 6.1.3 Capacity functional and Choquet theorem 207 6.1.4 Distributional properties 208 6.1.5 Miscellany 211 6.2 Random compact sets 213 6.2.1 Definition of means 213 6.2.2 Mean-value formulae for convex random sets 215 6.3 Characteristics for stationary and isotropic random closed sets 216 6.3.1 The area or volume fraction 216 6.3.2 The covariance 217 6.3.3 Contact distribution functions 223 6.3.4 Chord length distributions 226 6.3.5 Directional analysis of random closed sets 228 6.3.6 Intensities or densities of random closed sets 229 6.4 Nonparametric statistics for stationary random closed sets 230 6.4.1 Introduction 230 6.4.2 Estimation of the area or volume fraction p 230 6.4.3 Estimation of the covariance 233 6.4.4 Second-order analysis with random fields 234 6.4.5 Estimation of contact distributions 235 6.4.6 Representative volume elements 236 6.5 Germ-grain models 237 6.5.1 Basic facts 237 6.5.2 Formulae for p and C(r) 238 6.5.3 Models of mutually non-overlapping balls 239 6.5.4 Shot-noise germ-grain models 245 6.5.5 Weighted grain distributions 247 6.5.6 Intersection formulae 248 6.5.7 Statistics for motion-invariant germ-grain models 250 6.6 Other random closed set models 255 6.6.1 Gibbs discrete random sets 255 6.6.2 Dilated fibre and surface processes 259 6.6.3 Excursion sets 259 6.6.4 Birth-and-growth processes 269 6.7 Stochastic reconstruction of random sets 276 7 Random measures 279 7.1 Fundamentals 279 7.1.1 Introduction 279 7.1.2 Definitions and facts 280 7.1.3 Palm distributions 281 7.1.4 Marked random measures 283 7.2 Moment measures and related characteristics 284 7.2.1 The Laplace functional 284 7.2.2 Moment measures 284 7.3 Examples of random measures 286 7.3.1 Random measures constructed from point processes 286 7.3.2 Random measures constructed from random fields 286 7.3.3 Completely random measures 286 7.3.4 Random measures generated by random closed sets: Curvature measures 287 8 Line, fibre and surface processes 297 8.1 Introduction 297 8.2 Flat processes 302 8.2.1 Introduction 302 8.2.2 Planar line processes 302 8.2.3 Spatial line and plane processes 311 8.2.4 Applications of line and plane processes 313 8.3 Planar fibre processes 314 8.3.1 Fundamentals 314 8.3.2 Intersections of fibre processes 322 8.3.3 Basic statistical methods for planar fibre processes 327 8.4 Spatial fibre processes 330 8.5 Surface processes 333 8.5.1 Plane processes 333 8.5.2 General surface processes 335 8.6 Marked fibre and surface processes 339 9 Random tessellations, geometrical networks and graphs 343 9.1 Introduction and definitions 343 9.2 Mathematical models for random tessellations 346 9.3 General ideas and results for stationary planar tessellations 357 9.3.1 Point processes related to tessellations 357 9.3.2 Typical vertex, edge and cell 358 9.3.3 Zero cell 359 9.3.4 Mean-value relationships for stationary planar tessellations 359 9.3.5 The neighbourhood of the typical cell 366 9.4 Mean-value formulae for stationary spatial tessellations 367 9.5 Poisson line and plane tessellations 370 9.5.1 Poisson line tessellations 371 9.5.2 Poisson plane tessellations 373 9.6 STIT tessellations 375 9.7 Poisson-Voronoi and Delaunay tessellations 376 9.7.1 General 376 9.7.2 Planar Poisson-Voronoi tessellations (Poisson-Dirichlet tessellations) 377 9.7.3 Spatial Poisson-Voronoi tessellations 380 9.7.4 Poisson-Delaunay tessellations 383 9.8 Laguerre tessellations 386 9.9 Johnson-Mehl tessellations 388 9.10 Statistics for stationary tessellations 390 9.10.1 Reconstruction 390 9.10.2 Summary characteristics 390 9.10.3 Statistics for planar tessellations 391 9.10.4 Statistics for Voronoi, Laguerre and Johnson-Mehl tessellations 393 9.11 Random geometrical networks 397 9.11.1 Introduction 397 9.11.2 Formal definition of random geometrical networks 398 9.11.3 Summary characteristics of stationary random geometrical networks 399 9.11.4 Statistics for networks 400 9.11.5 Models of random geometrical networks 401 9.12 Random graphs 402 9.12.1 Introduction 402 9.12.2 Random graph models and their properties 403 10 Stereology 411 10.1 Introduction 411 10.2 The fundamental mean-value formulae of stereology 413 10.2.1 Notation 413 10.2.2 Planar and linear sections 414 10.2.3 Thick sections 419 10.2.4 Stereology for excursion sets 420 10.2.5 On the precision of stereological estimators 421 10.3 Stereological mean-value formulae for germ-grain models 421 10.3.1 Planar sections 421 10.3.2 Thick sections of spatial germ-grain models 424 10.3.3 Tubular structures and membranes 425 10.4 Stereological methods for spatial systems of balls 425 10.4.1 Introduction 425 10.4.2 Planar sections and the Wicksell corpuscle problem 426 10.4.3 Linear sections 433 10.4.4 Thick sections 435 10.4.5 Sieving distributions for balls 436 10.5 Stereological problems for nonspherical grains (shape-and-size problems) 436 10.5.1 General remarks 436 10.5.2 Two particular grain shapes 439 10.6 Stereology for spatial tessellations 440 10.7 Second-order characteristics and directional distributions 444 10.7.1 Introduction 444 10.7.2 Stereological determination of the pair correlation function of a system of ball centres 445 10.7.3 Second-order analysis for spatial fibre systems 448 10.7.4 Determination of directional distributions 451 References 453 Author index 507 Subject index 521
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spelling	Stochastische Geometrie Stochastic geometry and its applications Sung Nok Chiu (Department of mathematics, Hong Kong Baptist University, Hong Kong) ; Dietrich Stoyan (Institut für Stochastik, TU Bergakademie Freiberg, Germany) ; Wilfrid S. Kendall (Department of Statistics, University of Warwick, UK) ; Joseph Mecke (Institut für Stochastik, Friedrich-Schiller-Universität Jena, Germany) Third edition Chichester, West Sussex, PO19 8SQ, United Kingdom Wiley 2013 XXVI, 544 Seiten Illustrationen, Diagramme txt rdacontent n rdamedia nc rdacarrier Wiley series in probability and statistics Bis 2. Auflage unter dem Titel: Stoyan, Dietrich: Stochastic geometry and its applications Stochastic geometry Anwendung (DE-588)4196864-5 gnd rswk-swf Stochastische Geometrie (DE-588)4133202-7 gnd rswk-swf Stochastischer Prozess (DE-588)4057630-9 gnd rswk-swf Geometrie (DE-588)4020236-7 gnd rswk-swf Geometrie (DE-588)4020236-7 s Stochastischer Prozess (DE-588)4057630-9 s DE-604 Stochastische Geometrie (DE-588)4133202-7 s Anwendung (DE-588)4196864-5 s Chiu, Sung Nok (DE-588)1060736489 aut Stoyan, Dietrich 1940- (DE-588)115587551 aut Kendall, Wilfrid S. (DE-588)1060737744 aut Mecke, Joseph 1938- (DE-588)1025875605 aut Erscheint auch als Online-Ausgabe 978-1-118-65822-2 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=026064988&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Chiu, Sung Nok Stoyan, Dietrich 1940- Kendall, Wilfrid S. Mecke, Joseph 1938- Stochastic geometry and its applications Stochastic geometry Anwendung (DE-588)4196864-5 gnd Stochastische Geometrie (DE-588)4133202-7 gnd Stochastischer Prozess (DE-588)4057630-9 gnd Geometrie (DE-588)4020236-7 gnd
subject_GND	(DE-588)4196864-5 (DE-588)4133202-7 (DE-588)4057630-9 (DE-588)4020236-7
title	Stochastic geometry and its applications
title_alt	Stochastische Geometrie
title_auth	Stochastic geometry and its applications
title_exact_search	Stochastic geometry and its applications
title_full	Stochastic geometry and its applications Sung Nok Chiu (Department of mathematics, Hong Kong Baptist University, Hong Kong) ; Dietrich Stoyan (Institut für Stochastik, TU Bergakademie Freiberg, Germany) ; Wilfrid S. Kendall (Department of Statistics, University of Warwick, UK) ; Joseph Mecke (Institut für Stochastik, Friedrich-Schiller-Universität Jena, Germany)
title_fullStr	Stochastic geometry and its applications Sung Nok Chiu (Department of mathematics, Hong Kong Baptist University, Hong Kong) ; Dietrich Stoyan (Institut für Stochastik, TU Bergakademie Freiberg, Germany) ; Wilfrid S. Kendall (Department of Statistics, University of Warwick, UK) ; Joseph Mecke (Institut für Stochastik, Friedrich-Schiller-Universität Jena, Germany)
title_full_unstemmed	Stochastic geometry and its applications Sung Nok Chiu (Department of mathematics, Hong Kong Baptist University, Hong Kong) ; Dietrich Stoyan (Institut für Stochastik, TU Bergakademie Freiberg, Germany) ; Wilfrid S. Kendall (Department of Statistics, University of Warwick, UK) ; Joseph Mecke (Institut für Stochastik, Friedrich-Schiller-Universität Jena, Germany)
title_short	Stochastic geometry and its applications
title_sort	stochastic geometry and its applications
topic	Stochastic geometry Anwendung (DE-588)4196864-5 gnd Stochastische Geometrie (DE-588)4133202-7 gnd Stochastischer Prozess (DE-588)4057630-9 gnd Geometrie (DE-588)4020236-7 gnd
topic_facet	Stochastic geometry Anwendung Stochastische Geometrie Stochastischer Prozess Geometrie
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=026064988&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	UT stochastischegeometrie AT chiusungnok stochasticgeometryanditsapplications AT stoyandietrich stochasticgeometryanditsapplications AT kendallwilfrids stochasticgeometryanditsapplications AT meckejoseph stochasticgeometryanditsapplications

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