Random Walks and Heat Kernels on Graphs

Random Walks and Heat Kernels on Graphs

EnglishEbook
Barlow, Martin T.
Cambridge University Press
EAN: 9781108125000
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This introduction to random walks on infinite graphs gives particular emphasis to graphs with polynomial volume growth. It offers an overview of analytic methods, starting with the connection between random walks and electrical resistance, and then proceeding to study the use of isoperimetric and Poincare inequalities. The book presents rough isometries and looks at the properties of a graph that are stable under these transformations. Applications include the 'type problem': determining whether a graph is transient or recurrent. The final chapters show how geometric properties of the graph can be used to establish heat kernel bounds, that is, bounds on the transition probabilities of the random walk, and it is proved that Gaussian bounds hold for graphs that are roughly isometric to Euclidean space. Aimed at graduate students in mathematics, the book is also useful for researchers as a reference for results that are hard to find elsewhere.
EAN 9781108125000
ISBN 110812500X
Binding Ebook
Publisher Cambridge University Press
Publication date February 23, 2017
Language English
Country Uruguay
Authors Barlow, Martin T.
Series London Mathematical Society Lecture Note Series