Standard monomials of 1-skeleton ideals of multigraphs

Abstract

Given a graph G on the vertex set \0,1,…,n\ with the root vertex 0, Postnikov and Shapiro associated a monomial ideal MG in the polynomial ring R=K[x1,…,xn] over a field K such that K(R/MG)= LG, where LG is the truncated Laplacian of G. Dochtermann introduced the 1-skeleton ideal MG(1) of MG which satisfies the property that K(R/MG(1)) QG, where QG is the truncated signless Laplacian of G. In this paper we characterize all subgraphs of the multigraph Kn+1a,1, in particular all simple graphs G, such that K(R/MG(1))= QG. Moreover, we give examples of subgraphs G of the complete multigraph Kn+1a,b, in which the equality K(R/MG(1))= QG holds. We also provide a conjecture on the structure of a general multigraph satisfying the above-mentioned equality.