Modular Weil representation and compatibility of cuspidals with congruences

Abstract

Let F be a non-archimedean local field of characteristic different from 2 and of residual characteristic p. We generalise the theory of the Weil representation over F with complex coefficients to -modular representations i.e. when the complex coefficients are replaced by a coefficient field R of characteristic ≠ p. We obtain along the way a generalisation of the Stone-von Neumann theorem to the -modular setting, together with the Weil representation with coefficients in R on the R-metaplectic group. Surprisingly enough, the latter R-metaplectic group happens to be split over the symplectic group if = 2. The theory also makes sense when F is a finite field of odd characteristic. We also establish the irreducibility of the theta lift in the cuspidal case as long as does not divide the pro-orders of the groups at stake and we provide a compatibility to congruences in this setting via an integral version of the theta lift.