Stochastic geometry : modern research frontiers
Material type:
TextSeries: Lecture notes in mathematics ; 2237Publication details: Cham, Switzerland : Springer, 2019. Description: xiii, 229 pages : illustrations (44 b/w illustrations, 27 illustrations in colour)ISBN: 9783030135461Subject(s): Stochastic geometry | Convex geometry | Random graphs | Stochastic processes | Spatial statisticsDDC classification: 519.216 Online resources: Table of content | Reviews Summary: This volume offers a unique and accessible overview of the most active fields in Stochastic Geometry, up to the frontiers of recent research. Since 2014, the yearly meeting of the French research structure GDR GeoSto has been preceded by two introductory courses. This book contains five of these introductory lectures. The first chapter is a historically motivated introduction to Stochastic Geometry which relates four classical problems (the Buffon needle problem, the Bertrand paradox, the Sylvester four-point problem and the bicycle wheel problem) to current topics. The remaining chapters give an application motivated introduction to contemporary Stochastic Geometry, each one devoted to a particular branch of the subject: understanding spatial point patterns through intensity and conditional intensities; stochastic methods for image analysis; random fields and scale invariance; and the theory of Gibbs point processes. Exposing readers to a rich theory, this book will encourage further exploration of the subject and its wide applications.
| Item type | Current library | Call number | Status | Date due | Barcode |
|---|---|---|---|---|---|
Book
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NISER LIBRARY | 519.216 COU-S (Browse shelf(Opens below)) | Available | 25807 |
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| 519.216 CHO-S Stochastic partial differential equations | 519.216 CLA-S Surveys in combinatorics 2017 | 519.216 COL-D Discrete stochastic processes and applications | 519.216 COU-S Stochastic geometry : modern research frontiers | 519.216 DOO-S Stochastic processess | 519.216 DUR-E Essentials of stochastic processes | 519.216 EVA-I Introduction to stochastic differential equations (an) |
Includes bibliographical references
This volume offers a unique and accessible overview of the most active fields in Stochastic Geometry, up to the frontiers of recent research. Since 2014, the yearly meeting of the French research structure GDR GeoSto has been preceded by two introductory courses. This book contains five of these introductory lectures. The first chapter is a historically motivated introduction to Stochastic Geometry which relates four classical problems (the Buffon needle problem, the Bertrand paradox, the Sylvester four-point problem and the bicycle wheel problem) to current topics. The remaining chapters give an application motivated introduction to contemporary Stochastic Geometry, each one devoted to a particular branch of the subject: understanding spatial point patterns through intensity and conditional intensities; stochastic methods for image analysis; random fields and scale invariance; and the theory of Gibbs point processes. Exposing readers to a rich theory, this book will encourage further exploration of the subject and its wide applications.
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