The Waring Problem for Matrix Algebras, II
Abstract
Let f bea noncommutativepolynomial of degree m 1 over an algebraically closed field F of characteristic 0. If n m-1 and α1,α2,α3 are nonzero elements from F such that α1+α2+α3=0, then every trace zero n× n matrix over F can be written as α1 A1+α2A2+α3A3 for some Ai in the image of f in Mn(F).
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