Separating symmetric polynomials over finite fields

Abstract

The set S(n) of all elementary symmetric polynomials in n variables is a minimal generating set for the algebra of symmetric polynomials in n variables, but over a finite field Fq the set S(n) is not a minimal separating set for symmetric polynomials in general. We determined when S(n) is a minimal separating set for the algebra of symmetric polynomials having the least possible number of elements.