On a Theorem of Jiang and Rallis

Abstract

Jiang and Rallis (1997) defined a family of local integrals attached to a cubic polynomial and proved explicit evaluations of them over a non-archimedean local field F, when either F contains three third roots of unity, or the defining polynomial is reducible. The restriction on F allowed them, among other things, to reduce the case of irreducible polynomials of the form x3-a. Pleso (2009) began the work of removing the restriction on F by expressing the integral as a sum of 16 integrals for the cubic polynomial x3 - b x - c with b,c∈ F, and computing nine of them. In this work, we compute 15 of Pleso's integrals, and reduce the last to an elementary assertion about the number of points on a surface over a finite field, in the special case when F is the p-adic numbers, F=Qp, and p is equivalent to 5 mod 6. Our computations essentially complete Pleso's work in that special case. In the interim, Xiong (2020) has computed the integrals for an arbitrary non-archimedean local field by a totally different approach. Our direct approach might be more extendable to analogous integrals defined using quintic polynomials, in a higher-rank setting.