Litcius/Paper detail

Optimization of eigenvalue bounds for the independence and chromatic number of graph powers

Aida Abiad, Gabriel Coutinho, M.A. Fiol, Bruno Nogueira, Sjanne Zeijlemaker

2021Discrete Mathematics11 citationsDOIOpen Access PDF

Abstract

The kth power of a graph G=(V,E), Gk, is the graph whose vertex set is V and in which two distinct vertices are adjacent if and only if their distance in G is at most k. This article proves various eigenvalue bounds for the independence number and chromatic number of Gk which purely depend on the spectrum of G, together with a method to optimize them. Our bounds for the k-independence number also work for its quantum counterpart, which is not known to be a computable parameter in general, thus justifying the use of integer programming to optimize them. Some of the bounds previously known in the literature follow as a corollary of our main results. Infinite families of graphs where the bounds are sharp are presented as well.

Topics & Concepts

MathematicsCorollaryCombinatoricsChromatic scaleIndependence numberEigenvalues and eigenvectorsVertex (graph theory)Critical graphDiscrete mathematicsGraphUpper and lower boundsGraph powerLine graphQuantum mechanicsPhysicsMathematical analysisGraph theory and applicationsGraph Labeling and Dimension ProblemsAdvanced Graph Theory Research