Prime ideals and regular sequences of symmetric polynomials

Abstract

Let S=K[x1,...,xn] be a polynomial ring. Denote by pa the power sum symmetric polynomial x1a+...+xna. We consider the following two questions: Describe the subsets A ⊂ N such that the set of polynomials pa with a ∈ A generate a prime ideal in S or the set of polynomials pa with a ∈ A is a regular sequence in S. We produce a large families of prime ideals by exploiting Serre's criterion for normality [4, Theorem 18.15] with the help of arithmetic considerations, vanishing sums of roots of unity [9]. We also deduce several other results concerning regular sequences of symmetric polynomials.