On a refined local converse theorem for SO(4)

Abstract

Recently, Hazeltine-Liu, and independently Haan-Kim-Kwon, proved a local converse theorem for SO2n(F) over a p-adic field F, which says that, up to an outer automorphism of SO2n(F), an irreducible generic representation of SO2n(F) is uniquely determined by its twisted gamma factors by generic representations of GLk(F) for k=1,…,n. It is desirable to remove the ``up to an outer automorphism" part in the above theorem using more twisted gamma factors, but this seems a hard problem. In this paper, we provide a solution to this problem for the group SO4(F), namely, we show that a generic supercuspidal representation π of SO4(F) is uniquely determined by its GL1, GL2 twisted local gamma factors and a twisted exterior square local gamma factor of π.