Igusa's p-adic local zeta function associated to a polynomial mapping and a polynomial integration measure

Abstract

For p prime, we give an explicit formula for Igusa's local zeta function associated to a polynomial mapping f=(f1,...,ft): Qpn -> Qpt, with f1,...,ft in Zp[x1,...,xn], and an integration measure on Zpn of the form |g(x)||dx|, with g another polynomial in Zp[x1,...,xn]. We treat the special cases of a single polynomial and a monomial ideal separately. The formula is in terms of Newton polyhedra and will be valid for f and g sufficiently non-degenerated over Fp with respect to their Newton polyhedra. The formula is based on, and is a generalization of results of Denef - Hoornaert, Howald et al., and Veys - Zuniga-Galindo.