Integral structures in smooth GL2(Qp)-representations and zeta integrals

Abstract

Using zeta-integrals and lattices of functions on a spherical variety, we study integral structures in spherical representations of GL2(Qp) and their interaction with the unique linear functional invariant under an unramified maximal torus. Within this framework, we reformulate and prove the first instance of optimality of abstract integral norm-relations as proposed by Loeffler. We also interpret this as a form of integrality for toric periods associated to modular forms, where part of it can be regarded as an arithmetic integral analogue of Waldspurger's multiplicity one in the unramified setting.