Polynomial Maps with Constants on Matrix Algebra

Abstract

Let A be an F-algebra and ω ∈ A x1, …, xm which defines a map Am → A by evaluation, called a polynomial map with constant. We consider A = Mn(F), the algebra of n × n matrices over an algebraically closed field F of characteristic 0, and polynomial maps given by ω(x1, x2) = A1x1k + A2x2k, where A1,A2∈ Mn( F). For n=2, the images of such a map is competely determined in an earlier work (Panja, S.; Saini, P.; Singh, A., Images of polynomial maps with constants, Mathematika 71 (2025), no. 3, Paper No. e70031). In this article, by assuming one of the coefficients, say A1, is invertible, we relate the surjectivity of ω to the nullity of A2. When n=3, 4, we completely classify the surjectivity of ω(x1, x2) by obtaining the necessary and sufficient condition in terms of n, k, and the nullity of A2.