Maximum-Entropy Networks : Pattern Detection, Network Reconstruction and Graph Combinatorics / by Tiziano Squartini, Diego Garlaschelli.

Format:

Book

Author/Creator:

Squartini, Tiziano., Author.

Garlaschelli, Diego., Author.

Series:

Understanding Complex Systems, 2191-5326

Language:

English

Subjects (All):

Physics.

Statistical physics.

System theory.

Graph theory.

Computational complexity.

Applications of Graph Theory and Complex Networks.

Statistical Physics and Dynamical Systems.

Complex Systems.

Graph Theory.

Complexity.

Local Subjects:

Applications of Graph Theory and Complex Networks.

Statistical Physics and Dynamical Systems.

Complex Systems.

Graph Theory.

Complexity.

Physical Description:

1 online resource (XII, 116 p. 34 illus., 31 illus. in color.)

Edition:

1st ed. 2017.

Place of Publication:

Cham : Springer International Publishing : Imprint: Springer, 2017.

Summary:

This book is an introduction to maximum-entropy models of random graphs with given topological properties and their applications. Its original contribution is the reformulation of many seemingly different problems in the study of both real networks and graph theory within the unified framework of maximum entropy. Particular emphasis is put on the detection of structural patterns in real networks, on the reconstruction of the properties of networks from partial information, and on the enumeration and sampling of graphs with given properties. After a first introductory chapter explaining the motivation, focus, aim and message of the book, chapter 2 introduces the formal construction of maximum-entropy ensembles of graphs with local topological constraints. Chapter 3 focuses on the problem of pattern detection in real networks and provides a powerful way to disentangle nontrivial higher-order structural features from those that can be traced back to simpler local constraints. Chapter 4 focuses on the problem of network reconstruction and introduces various advanced techniques to reliably infer the topology of a network from partial local information. Chapter 5 is devoted to the reformulation of certain “hard” combinatorial operations, such as the enumeration and unbiased sampling of graphs with given constraints, within a “softened” maximum-entropy framework. A final chapter offers various overarching remarks and take-home messages. By requiring no prior knowledge of network theory, the book targets a broad audience ranging from PhD students approaching these topics for the first time to senior researchers interested in the application of advanced network techniques to their field.

Contents:

Introduction

Maximum-entropy ensembles of graphs

Constructing constrained graph ensembles: why and how?

Comparing models obtained from different constraints

Pattern detection

Detecting assortativity and clustering

Detecting dyadic motifs

Detecting triadic motifs

Some extensions to weighted networks

Network reconstruction

Reconstructing network properties from partial information

The Enhanced Configuration Model

Further reducing the observational requirements

Graph combinatorics

A dual route to combinatorics?

‘Soft’ combinatorial enumeration

Quantifying ensemble (non)equivalence

Breaking of equivalence between ensembles

Implications of (non)equivalence for combinatorics

“What then shall we choose?” Hardness or softness?

Concluding remarks.

Notes:

Includes bibliographical references at the end of each chapters and index.

ISBN:

3-319-69438-3