English

Degree-Similar Graphs

Combinatorics 2024-07-17 v1

Abstract

The degree matrix of a graph is the diagonal matrix with diagonal entries equal to the degrees of the vertices of XX. If X1X_1 and X2X_2 are graphs with respective adjacency matrices A1A_1 and A2A_2 and degree matrices D1D_1 and D2D_2, we say that X1X_1 and X2X_2 are degree similar if there is an invertible real matrix MM such that M1A1M=A2M^{-1}A_1M=A_2 and M1D1M=D2M^{-1}D_1M=D_2. If graphs X1X_1 and X2X_2 are degree similar, then their adjacency matrices, Laplacian matrices, unsigned Laplacian matrices and normalized Laplacian matrices are similar. We first show that the converse is not true. Then, we provide a number of constructions of degree-similar graphs. Finally, we show that the matrices A1μD1A_1-\mu D_1 and A2μD2A_2-\mu D_2 are similar over the field of rational functions Q(μ)\mathbb{Q}(\mu) if and only if the Smith normal forms of the matrices tI(A1μD1)tI-(A_1-\mu D_1) and tI(A2μD2)tI-(A_2-\mu D_2) are equal.

Keywords

Cite

@article{arxiv.2407.11328,
  title  = {Degree-Similar Graphs},
  author = {Chris Godsil and Wanting Sun},
  journal= {arXiv preprint arXiv:2407.11328},
  year   = {2024}
}

Comments

22 pages, 8 figures

R2 v1 2026-06-28T17:42:26.140Z