Matrices over finite fields of odd characteristic as sums of diagonalizable and square-zero matrices

Abstract

Let F be a finite field of odd characteristic. When |F| 5, we prove that every matrix A admits a decomposition into D+M where D is diagonalizable and M2=0. For F=F3, we show that such decomposition is possible for non-derogatory matrices of order at least 5, and more generally, for matrices whose first invariant factor is not a non-zero trace irreducible polynomial of degree 3; we also establish that matrices consisting of direct sums of companion matrices, all of them associated to the same irreducible polynomial of non-zero trace and degree 3 over F3, never admit such decomposition. These results completely settle the question posed by Breaz in Lin. Algebra & Appl. (2018) asking if it is true that for big enough positive integers n 3 all matrices A over a field of odd cardinality q admit decompositions of the form E+M with Eq=D and M2=0: the answer is yes for q 5, but there are counterexamples for q=3 and each order n=3k, k 1.