Abstract

We call a vertex $x$ of a graph $G=(V,E)$ a codominated vertex if $N_G[y]\subseteq N_G[x]$ for some vertex $y\in V\backslash \{x\}$, and a graph $G$ is called codismantlable if either it is an edgeless graph or it contains a codominated vertex $x$ such that $G-x$ is codismantlable. We show that $(C_4,C_5)$-free vertex-decomposable graphs are codismantlable, and prove that if $G$ is a $(C_4,C_5,C_7)$-free well-covered graph, then vertex-decomposability, codismantlability and Cohen-Macaulayness for $G$ are all equivalent. These results complement and unify many of the earlier results on bipartite, chordal and very well-covered graphs. We also study the Castelnuovo-Mumford regularity $reg(G)$ of such graphs, and show that $reg(G)=im(G)$ whenever $G$ is a $(C_4,C_5)$-free vertex-decomposable graph, where $im(G)$ is the induced matching number of $G$. Furthermore, we prove that $H$ must be a codismantlable graph if $im(H)=reg(H)=m(H)$, where $m(H)$ is the matching number of $H$. We further describe an operation on digraphs that creates a vertex-decomposable and codismantlable graph from any acyclic digraph. By way of application, we provide an infinite family $H_n$ ($n\geq 4$) of sequentially Cohen-Macaulay graphs whose vertex cover numbers are half of their orders, while containing no vertex of degree-one such that they are vertex-decomposable, and $reg(H_n)=im(H_n)$ if $n\geq 6$. This answers a recent question of Mahmoudi et al.

Highlights

  • The present work is devoted to the study of algebraic and combinatorial properties of a new graph class, codismantlable graphs

  • We show that (C4, C5)-free vertex-decomposable graphs are codismantlable, and prove that if G is a (C4, C5, C7)-free well-covered graph, vertexdecomposability, codismantlability and Cohen-Macaulayness for G are all equivalent

  • We prove that if a graph G lacks certain induced cycles, the vertex-decomposability and Cohen-Macaulayness of G relies upon the codismantlability of G

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Summary

Introduction

The present work is devoted to the study of algebraic and combinatorial properties of a new graph class, codismantlable graphs. We prove that if a graph G lacks certain induced cycles, the vertex-decomposability and (sequentially) Cohen-Macaulayness of G relies upon the codismantlability of G Such an approach permits to read off the Castelnuovo-Mumford regularity of such graphs combinatorially. If a vertex-decomposable graph belongs to one of these graph classes with at least one edge, it has a shedding vertex x satisfying that the closed neighborhood set of one of its neighbors is contained in that of x Such an observation naturally raises a simple question: What conditions on a given graph guarantee that its shedding vertices (if any) satisfy this property? We introduce the edge-clique-whiskering of a given graph with respect to any of its edge-clique partition, and provide an infinite family of sequentially Cohen-Macaulay graphs whose vertex cover numbers are half of their orders, while containing no vertex of degree-one

Preliminaries
Vertex-decomposable graphs and codismantlability
Regularity of codismantlable graphs
Orientations and vertex-decomposable graphs
Conclusion

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