Complements of coalescing sets

Abstract

We consider matrices of the form qD+A, with D being the diagonal matrix of degrees, A being the adjacency matrix, and q a fixed value. Given a graph H and B⊂eq V(G), which we call a coalescent pair (H,B), we derive a formula for the characteristic polynomial where a copy of same rooted graph G is attached by the root to each vertex of B. Moreover, we establish if (H1,B1) and (H2,B2) are two coalescent pairs which are cospectral for any possible rooted graph G, then (H1,V(H1) B1) and (H2,V(H2) B2) will also always be cospectral for any possible rooted graph G.