Non-zero condition on Mglin-Renard's parametrization for Arthur packets of U(p,q)

Abstract

Mglin-Renard parametrized A-packet of unitary group through cohomological induction in good parity case. Each parameter gives rise to an A q(λ) which is either 0 or irreducible. Trapa proposed an algorithm to determine whether a ``mediocre'' A q(λ) of U(p, q) is non-zero. Based on his result, we present a further understanding of the non-zero condition on Mglin-Renard's parametrization. Our criterion comes out to be a system of linear constraints, and has the same formulation as p-adic case. This suggests a map from A-packets of real unitary group to A-packets of p-adic symplectic group or special orthogonal group.