Values of multilinear graded *-polynomials on upper triangular matrices of small dimension

Abstract

Let F be an algebraically closed field of characteristic different from 2. We show that the images of multilinear *-polynomials on UT2 are homogeneous vector spaces. An analogous result holds for UT3 endowed with non-trivial grading. We further show that these results are optimal, in the following sense: there exist multilinear +graded polynomials whose image on UTn (n≥ 3) with the trivial grading is not a vector space, and whose image on (UTn) (n≥ 4) with the Zn-grading is also not a vector space. In particular, an analog of the L'vov-Kaplansky conjecture can not be expected in the setting of algebras with (graded) involutions.