On Prime Matrix Product Factorizations
Abstract
A graph G factors into graphs H and K via a matrix product if A = BC, where A, B, and C are the adjacency matrices of G, H, and K, respectively. The graph G is prime if, in every such factorization, one of the factors is a perfect matching that is, it corresponds to a permutation matrix. We characterize all prime graphs, then using this result we classify all factorable forests, answering a question of Akbari et al. [Linear Algebra and its Applications (2025)]. We prove that every torus is factorable, and we characterize all possible factorizations of grids, addressing two questions posed by Maghsoudi et al. [Journal of Algebraic Combinatorics (2025)].
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