Sums of Multivariate Polynomials in Finite Subgroups

Abstract

Let R be a commutative ring, f ∈ R[X1,…,Xk] a multivariate polynomial, and G a finite subgroup of the group of units of R satisfying a certain constraint, which always holds if R is a field. Then, we evaluate Σ f(x1,…,xk), where the summation is taken over all pairwise distinct x1,…,xk ∈ G. In particular, let ps be a power of an odd prime, n a positive integer coprime with p-1, and a1,…,ak integers such that (ps) divides a1+·s+ak and p-1 does not divide Σi ∈ Iai for all non-empty proper subsets I⊂eq \1,…,k\; then Σ x1a1·s xkak (ps)gcd(n,(ps))(-1)k-1(k-1)! \,\,ps, where the summation is taken over all pairwise distinct n-th residues x1,…,xk modulo ps coprime with p.