The Mathematics of Finite Networks: An Introduction to Operator Graph Theory

Hardback

Main Details

Title The Mathematics of Finite Networks: An Introduction to Operator Graph Theory
Authors and Contributors      By (author) Michael Rudolph
Physical Properties
Format:Hardback
Pages:200
Dimensions(mm): Height 235,Width 157
Category/GenreDatabases
Computer networking and communications
ISBN/Barcode 9781107134430
ClassificationsDewey:511.5
Audience
General

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 12 May 2022
Publication Country United Kingdom

Description

Since the early eighteenth century, the theory of networks and graphs has matured into an indispensable tool for describing countless real-world phenomena. However, the study of large-scale features of a network often requires unrealistic limits, such as taking the network size to infinity or assuming a continuum. These asymptotic and analytic approaches can significantly diverge from real or simulated networks when applied at the finite scales of real-world applications. This book offers an approach to overcoming these limitations by introducing operator graph theory, an exact, non-asymptotic set of tools combining graph theory with operator calculus. The book is intended for mathematicians, physicists, and other scientists interested in discrete finite systems and their graph-theoretical description, and in delineating the abstract algebraic structures that characterise such systems. All the necessary background on graph theory and operator calculus is included for readers to understand the potential applications of operator graph theory.

Author Biography

Michael Rudolph is a mathematical physicist of the French National Centre for Scientific Research at the Institut Denis Poisson. His research includes graph theory and classical number theory, and is directed towards understanding physical reality from an inherently finite discrete perspective, both mathematically and philosophically.