The split case of the Prasad--Takloo-Bighash conjecture for cuspidal representations of level zero

Abstract

Let E/F be a quadratic extension of non archimedean local fields of odd residual characteristic. We prove a conjecture of Prasad and Takloo-Bighash, in the case of cuspidal representations of depth zero of GL(2m,F). This conjecture characterizes distinction for the pair (GL(2m,F),GL(m,E)) with respect to a character μ det of GL(m,E), in terms of certain conditions on Langlands paremeters, including an epsilon value. We also compute the multiplicity of the involved equivariant linear forms when E/F is unramified, and also when μ is tame. In both cases this multiplicity is at most one.