The sum and the product of two quadratic matrices

Abstract

Let p and q be polynomials with degree 2 over an arbitrary field F. In the first part of this article, we characterize the matrices that can be decomposed as A+B for some pair (A,B) of square matrices such that p(A)=0 and q(B)=0. The case when both polynomials p and q are split was already known. In the first half of this article, we complete the study by tackling the case when at least one of the polynomials p and q is irreducible over F. In the second half of the article, we use a similar method to characterize, under the assumption that p(0)q(0) ≠ 0, the matrices that can be decomposed as AB for some pair (A,B) of square matrices such that p(A)=0 and q(B)=0.