Arithmetical Structures on Ladder Graphs

Abstract

In this paper, we investigate arithmetical structures on Cartesian product graphs, particularly, ladder graph of the form P2 Pm and grid graph of the form Pn Pm. An arithmetical structure on a finite and connected graph G is a pair (d, r) of positive integer vectors such that r is primitive (the gcd of its entries is 1) and (diag(d) - A)r = 0, where A is the adjacency matrix of G. Arithmetical structures have been widely studied for basic graph families such as paths and cycles. Extending these ideas to graph products, we first analyze the ladder graph P2 Pm, deriving structural properties and identifying patterns in the corresponding arithmetical configurations. We then generalize these results to the grid graph Pn Pm, where increased complexity arises due to higher-dimensional interactions. Our work provides new insights into the behavior, characterization, and enumeration of arithmetical structures on grid-like graphs, contributing to the broader understanding of Laplacian based invariants and their combinatorial properties.