Smith normal forms for coalescences at cospectral vertices

Abstract

Let Lμ(G)=A(G)-μD(G) be the generalized μ-adjacency matrix of a finite graph G. Fan, Xing, Zhang, and Wang constructed pairs of non-degree-similar trees for which the Smith normal forms of the matrices tI-Lμ(G) over Q(μ)[t] coincide, and conjectured that their construction remains valid when the attached rooted path is replaced by an arbitrary rooted tree. We prove this conjecture as a consequence of a more general coalescence theorem: if a finite graph H has two vertices u and v that are cospectral for Lμ(H), then, for every finite rooted graph R with root r, the matrices \[ tI-Lμ(R(r) H(u)) tI-Lμ(R(r) H(v)) \] have the same Smith normal form over Q(μ)[t], where denotes coalescence of rooted graphs. The proof uses an orthogonal intertwiner over a real closed extension field.