Similar Powers of a Matrix

Abstract

Let p,q be coprime integers such that |p|+|q|>2. We characterize the matrices A∈Mn(C) such that Ap and Aq are similar. If A is invertible, we prove that A is a polynomial in Ap and Aq. To achieve this, we study the matrix equation B-1ApB=Aq. We show that for such matrices, B-1AB and A commute. When A is diagonalizable, A is a root of In and B-1AB is a power of A. We explicitly solve the previous equation when A has n distinct eigenvalues or when A has a sole eigenvalue. In the second part, we completely solve the 2×2 case of the more general matrix equation ArBsAr'Bs'=I2.