Atoms in the Semigroup of Non-Negative Integer Matrices

Abstract

In the semigroup M2(N0), two-by-two matrices with non-negative integer entries and non-zero determinant, we study the factorization of matrices into atoms, or irreducible matrices. In 2022, Baeth et al. listed some fundamental classes of atoms in M2(N0); however, the factorability of most matrices in M2(N0) remains unknown. We identify two additional classes of atoms: a class of atoms with determinant p, 2p, or 4p, for p prime, and a class of atoms in which the main diagonal is much "larger" than the off-diagonal (or vice versa). Finally, we show that bisymmetric matrices with relatively prime entries are a divisor-closed subset of M2(N0) and use a factor search algorithm to classify bisymmetric atoms of M2(N0) with minimum entry up to 4000.