Power-central polynomials on matrices
Abstract
Any multilinear non-central polynomial p (in several noncommuting variables) takes on values of degree n in the matrix algebra Mn(F) over an infinite field F. The polynomial p is called -central for Mn(F) if p takes on only scalar values, with k minimal such. Multilinear -central polynomials do not exist for any with n>3, thereby answering a question of Drensky. Saltman proved that an arbitrary polynomial p cannot be -central for Mn(F) for n odd unless n is prime; we show for n even, that must be 2.
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