On Semi-Invariants of a Matrix

Abstract

For an algebraically closed field K of characteristic zero and a non-singular matrix A∈ GLn(K), a semi-invariant polynomial of A is defined to be a polynomial p(x)=p(x1,…,xn) with coefficients in K such that p(xA)=λ p(x) for some λ∈ K. In this article, we classify all semi-invariant polynomials of A in terms of a canonically constructed basis that will be made precise in the text.