Surjectivity of polynomial maps on Matrices

Abstract

For n≥ 2, we consider the map on Mn( K) given by evaluation of a polynomial f(X1, …, Xm) over the field K. In this article, we explore the image of the diagonal map given by f=δ1 X1k1 + δ2 X2k2 + ·s +δm Xmkm in terms of the solution of certain equations over K. In particular, we show that for m≥ 2, the diagonal map is surjective when (a) K= C, (b) K= Fq for large enough q. Moreover, when K= R and m=2 it is surjective except when n is odd, k1, k2 are both even, and δ 1δ2>0 (in that case the image misses negative scalars), and the map is surjective for m≥ 3. We further show that on Mn( H) the diagonal map is surjective for m≥ 2, where H is the algebra of Hamiltonian quaternions.