On matrices commuting with their Frobenius

Abstract

The Frobenius of a matrix M with coefficients in Fp is the matrix σ(M) obtained by raising each coefficient to the p-th power. We consider the question of counting matrices with coefficients in Fq which commute with their Frobenius, asymptotically when q is a large power of p. We give answers for matrices of size 2, for diagonalizable matrices, and for matrices whose eigenspaces are defined over Fp. Moreover, we explain what is needed to solve the case of general matrices. We also solve (for both diagonalizable and general matrices) the corresponding problem when one counts matrices M commuting with all the matrices σ(M), σ2(M), … in their Frobenius orbit.