Operator Theory And Analysis Of Infinite Networks
Title | Operator Theory And Analysis Of Infinite Networks PDF eBook |
Author | Palle Jorgensen |
Publisher | World Scientific |
Pages | 449 |
Release | 2023-03-21 |
Genre | Mathematics |
ISBN | 9811265534 |
This volume considers resistance networks: large graphs which are connected, undirected, and weighted. Such networks provide a discrete model for physical processes in inhomogeneous media, including heat flow through perforated or porous media. These graphs also arise in data science, e.g., considering geometrizations of datasets, statistical inference, or the propagation of memes through social networks. Indeed, network analysis plays a crucial role in many other areas of data science and engineering. In these models, the weights on the edges may be understood as conductances, or as a measure of similarity. Resistance networks also arise in probability, as they correspond to a broad class of Markov chains.The present volume takes the nonstandard approach of analyzing resistance networks from the point of view of Hilbert space theory, where the inner product is defined in terms of Dirichlet energy. The resulting viewpoint emphasizes orthogonality over convexity and provides new insights into the connections between harmonic functions, operators, and boundary theory. Novel applications to mathematical physics are given, especially in regard to the question of self-adjointness of unbounded operators.New topics are covered in a host of areas accessible to multiple audiences, at both beginning and more advanced levels. This is accomplished by directly linking diverse applied questions to such key areas of mathematics as functional analysis, operator theory, harmonic analysis, optimization, approximation theory, and probability theory.
Operator Theory and Analysis of Infinite Networks
Title | Operator Theory and Analysis of Infinite Networks PDF eBook |
Author | Palle E. T. Jørgensen |
Publisher | World Scientific Publishing Company |
Pages | 0 |
Release | 2023 |
Genre | Hilbert space |
ISBN | 9789811265518 |
This volume considers resistance networks: large graphs which are connected, undirected, and weighted. Such networks provide a discrete model for physical processes in inhomogeneous media, including heat flow through perforated or porous media. These graphs also arise in data science, e.g., considering geometrizations of datasets, statistical inference, or the propagation of memes through social networks. Indeed, network analysis plays a crucial role in many other areas of data science and engineering. In these models, the weights on the edges may be understood as conductances, or as a measure of similarity. Resistance networks also arise in probability, as they correspond to a broad class of Markov chains. The present volume takes the nonstandard approach of analyzing resistance networks from the point of view of Hilbert space theory, where the inner product is defined in terms of Dirichlet energy. The resulting viewpoint emphasizes orthogonality over convexity and provides new insights into the connections between harmonic functions, operators, and boundary theory. Novel applications to mathematical physics are given, especially in regard to the question of self-adjointness of unbounded operators. New topics are covered in a host of areas accessible to multiple audiences, at both beginning and more advanced levels. This is accomplished by directly linking diverse applied questions to such key areas of mathematics as functional analysis, operator theory, harmonic analysis, optimization, approximation theory, and probability theory.
Potential Theory on Infinite Networks
Title | Potential Theory on Infinite Networks PDF eBook |
Author | Paolo M. Soardi |
Publisher | Springer |
Pages | 199 |
Release | 2006-11-15 |
Genre | Mathematics |
ISBN | 3540487980 |
The aim of the book is to give a unified approach to new developments in discrete potential theory and infinite network theory. The author confines himself to the finite energy case, but this does not result in loss of complexity. On the contrary, the functional analytic machinery may be used in analogy with potential theory on Riemann manifolds. The book is intended for researchers with interdisciplinary interests in one of the following fields: Markov chains, combinatorial graph theory, network theory, Dirichlet spaces, potential theory, abstract harmonic analysis, theory of boundaries.
Operator Theory and Infinite Networks
Title | Operator Theory and Infinite Networks PDF eBook |
Author | Mohammad Reza Khadivi |
Publisher | |
Pages | 80 |
Release | 1988 |
Genre | Integrals, Infinite |
ISBN |
Infinite Electrical Networks
Title | Infinite Electrical Networks PDF eBook |
Author | Armen H. Zemanian |
Publisher | Cambridge University Press |
Pages | 328 |
Release | 1991-11-29 |
Genre | Mathematics |
ISBN | 0521401534 |
This book presents the salient features of the general theory of infinite electrical networks in a coherent exposition.
Potential Theory on Infinite Networks
Title | Potential Theory on Infinite Networks PDF eBook |
Author | Paolo Maurizio Soardi |
Publisher | Springer Verlag |
Pages | 187 |
Release | 1994-01-01 |
Genre | Mathematics |
ISBN |
The aim of the book is to give a unified approach to new developments in discrete potential theory and infinite network theory. The author confines himself to the finite energy case, but this does not result in loss of complexity. On the contrary, the functional analytic machinery may be used in analogy with potential theory on Riemann manifolds.The book is intended for researchers with interdisciplinary interests in one of the following fields: Markov chains, combinatorial graph theory, network theory, Dirichlet spaces, potential theory, abstract harmonic analysis, theory of boundaries.
Random Walks, Boundaries and Spectra
Title | Random Walks, Boundaries and Spectra PDF eBook |
Author | Daniel Lenz |
Publisher | Springer Science & Business Media |
Pages | 345 |
Release | 2011-06-16 |
Genre | Mathematics |
ISBN | 3034602448 |
These proceedings represent the current state of research on the topics 'boundary theory' and 'spectral and probability theory' of random walks on infinite graphs. They are the result of the two workshops held in Styria (Graz and St. Kathrein am Offenegg, Austria) between June 29th and July 5th, 2009. Many of the participants joined both meetings. Even though the perspectives range from very different fields of mathematics, they all contribute with important results to the same wonderful topic from structure theory, which, by extending a quotation of Laurent Saloff-Coste, could be described by 'exploration of groups by random processes'.