English

On almost distance-regular graphs

Combinatorics 2012-02-16 v1

Abstract

Distance-regular graphs are a key concept in Algebraic Combinatorics and have given rise to several generalizations, such as association schemes. Motivated by spectral and other algebraic characterizations of distance-regular graphs, we study `almost distance-regular graphs'. We use this name informally for graphs that share some regularity properties that are related to distance in the graph. For example, a known characterization of a distance-regular graph is the invariance of the number of walks of given length between vertices at a given distance, while a graph is called walk-regular if the number of closed walks of given length rooted at any given vertex is a constant. One of the concepts studied here is a generalization of both distance-regularity and walk-regularity called mm-walk-regularity. Another studied concept is that of mm-partial distance-regularity or, informally, distance-regularity up to distance mm. Using eigenvalues of graphs and the predistance polynomials, we discuss and relate these and other concepts of almost distance-regularity, such as their common generalization of (,m)(\ell,m)-walk-regularity. We introduce the concepts of punctual distance-regularity and punctual walk-regularity as a fundament upon which almost distance-regular graphs are built. We provide examples that are mostly taken from the Foster census, a collection of symmetric cubic graphs. Two problems are posed that are related to the question of when almost distance-regular becomes whole distance-regular. We also give several characterizations of punctually distance-regular graphs that are generalizations of the spectral excess theorem.

Keywords

Cite

@article{arxiv.1202.3265,
  title  = {On almost distance-regular graphs},
  author = {Cristina Dalfó and Edwin R. van Dam and Miquel Angel Fiol and Ernest Garriga and Bram L. Gorissen},
  journal= {arXiv preprint arXiv:1202.3265},
  year   = {2012}
}
R2 v1 2026-06-21T20:19:41.107Z