A general formula for walk determinants of rooted products with applications to DGS-graph constructions

Abstract

For an n-vertex graph G, and a rooted graph H(v) with v as the root, the rooted product graph G H(v) is obtained from G and n copies of H by identifying the root of the ith copy of H with the ith vertex of G for each i. As a refinement of the controllability criterion of G H(v) obtained recently by Shan and Liu (2025), we obtain an explicit formula for the determinant of the walk matrix of G H(v). Furthermore, for an important family of graphs F that are determined by their generalized spectrum (DGS), we introduce the concept of F-preservers and provide a sufficient condition for a rooted graph to be an F-preserver. A list of F-preservers of small order is provided, which leads to many new infinite families of DGS-graphs using rooted products.