The images of multilinear polynomials evaluated on 3× 3 matrices

Abstract

Let p be a multilinear polynomial in several noncommuting variables, with coefficients in a algebraically closed field K of arbitrary characteristic. In this paper we classify the possible images of p evaluated on 3× 3 matrices. The image is one of the following: itemize \0\, the set of scalar matrices, a (Zariski) dense subset of 3(K), the matrices of trace 0, a dense subset of M3(K), the set of 3-scalar matrices (i.e., matrices having eigenvalues (β, β , β 2) where is a cube root of 1), or the set of scalars plus 3-scalar matrices.