A Ridge-Saturation Characterization of α-Critical Wp Graphs

Abstract

We characterize the graphs which are simultaneously α-critical and members of the class Wp. The characterization is stated in three equivalent languages. In the graph itself, such a graph is a well-covered graph whose codimension-one localization fibers all have size at least p and whose edges are exactly covered by the cliques induced by those fibers. In the independence complex, it is a pure flag complex in which every ridge has degree at least p and every missing edge is generated by the link of a ridge. In the complement, it is a Kr+1-saturated graph, where r=α(G), all maximal cliques have size r, and the minimum (r-1)-clique-codegree is at least p. This gives an exact formula for the largest p for which a well-covered graph belongs to Wp. We make this complement correspondence explicit, record saturation-theoretic consequences including dense-complement rigidity and p-sensitive edge and order bounds, and give a family of sharp examples showing that the local sufficient condition from the recent work of Hoang, Levit and Mandrescu is not necessary outside the locally triangle-free setting, for all p2.