Walk entropy and walk-regularity

Kyle Kloster; Daniel Kr\'al'; and Blair D. Sullivan

arXiv:1708.09700·math.CO·February 8, 2018

Walk entropy and walk-regularity

Kyle Kloster, Daniel Kr\'al', and Blair D. Sullivan

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TL;DR

This paper constructs a counterexample graph that is not walk-regular but has maximum walk entropy, challenging a previous conjecture, and explores the relationship between walk entropy and walk-regularity across different temperatures.

Contribution

It provides a counterexample to a conjecture linking walk-regularity and maximum walk entropy, and characterizes when walk entropy equals the logarithm of the number of vertices.

Findings

01

Constructed a 24-vertex non-walk-regular graph with maximum walk entropy.

02

Proved that maximum walk entropy occurs only at specific temperatures for walk-regular graphs.

03

Established a criterion linking walk-regularity to walk entropy at certain temperatures.

Abstract

A graph is said to be walk-regular if, for each $ℓ \geq 1$ , every vertex is contained in the same number of closed walks of length $ℓ$ . We construct a $24$ -vertex graph $H_{4}$ that is not walk-regular yet has maximized walk entropy, $S^{V} (H_{4}, β) = lo g 24$ , for some $β > 0$ . This graph is a counterexample to a conjecture of Benzi [Linear Algebra Appl.~443 (2014), 395--399, Conjecture 3.1]. We also show that there exist infinitely many temperatures $β_{0} > 0$ so that $S^{V} (G, β_{0}) = lo g n_{G}$ if and only if a graph $G$ is walk-regular.

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