Waring Problem for Matrices over Finite Fields
Abstract
We prove that for all integers k ≥ 1, q (k-1)4+ 6k, and m ≥ 1, every matrix in Mm( Fq) is a sum of two kth powers: Mm( Fq)=\Ak+Bk|A,B∈ Mm( Fq)\. We further generalize and refine this result in the cases when both B and C can be chosen to be invertible, cyclic, or split semisimple, when k is coprime to p, or when m is sufficiently large. We also give a criterion for the Waring problem in terms of stabilizers.
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