Waring Problem for matrices over finite local rings

Abstract

This paper addresses the matrix Waring problem for matrices over finite principal local rings. Let O be a finite principal local ring of length with the maximal ideal m and the residue field Fq = O/m. When -1 is a k-th power in Fq and the characteristic of Fq does not divide k, we show that for sufficiently large q, any matrix in Mn(O) can be expressed as a sum of two k-th powers. Furthermore, we establish that these two conditions are strictly necessary for the result to hold in general.

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