One more remark on the adjoint polynomial
Abstract
The adjoint polynomial of G is \[h(G,x)=Σk=1n(-1)n-kak(G)xk,\] where ak(G) denotes the number of ways one can cover all vertices of the graph G by exactly k disjoint cliques of G. In this paper we show the the adjoint polynomial of a graph G is a simple transformation of the independence polynomial of another graph G. This enables us to use the rich theory of independence polynomials to study the adjoint polynomials. In particular we a give new proofs of several theorems of R. Liu and P. Csikv\'ari.
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