Period functions for vector-valued Maass cusp forms of real weight, with an application to Jacobi Maass cusp forms

Abstract

For vector-valued Maass cusp forms for~SL2(Z) with real weight~k∈R and spectral parameter s∈C, Re s∈ (0,1), s k/2 mod 1, we propose a notion of vector-valued period functions, and we establish a linear isomorphism between the spaces of Maass cusp forms and period functions by means of a cohomological approach. The period functions are a generalization of those for the classical Maass cusp forms, being solutions of a finite-term functional equation or, equivalently, eigenfunctions with eigenvalue 1 of a transfer operator deduced from the geodesic flow on the modular surface. We apply this result to deduce a notion of period functions and related linear isomorphism for Jacobi Maass forms of weight k+1/2 for the semi-direct product of SL2(Z) with the integer points Hei(Z) of the Heisenberg group.