Characterisation of the poles of the -modular Asai L-factor

Abstract

Let E/F be a quadratic extension of non-archimedean local fields, and let be a prime number different from the residual characteristic of F. For a complex cuspidal representation π of GL(n,E), the Asai L-factor L+(X,π) has a pole at X=1 if and only if π is GL(n,F)-distinguished. In this paper we solve the problem of characterising the occurrence of a pole at X=1 of L+(X,π) when π is an -modular cuspidal representation of GL(n,E): we show that L+(X,π) has a pole at X=1 if and only if π is a relatively banal distinguished representation; namely π is GL(n,F)-distinguished but not (~ )|F-distinguished. This notion turns out to be an exact analogue for the symmetric space GL(n,E)/GL(n,F) of M\' inguez and S\'echerre's notion of banal cuspidal F-representation of GL(n,F). Along the way we compute the Asai L-factor of all cuspidal -modular representations of GL(n,E) in terms of type theory, and prove new results concerning lifting and reduction modulo of distinguished cuspidal representations. Finally, we determine when the natural GL(n,F)-period on the Whittaker model of a distinguished cuspidal representation of GL(n,E) is nonzero.