Certain Fourier Operators on GL1 and Local Langlands Gamma functions

Abstract

For a split reductive group G over a number field k, let be an n-dimensional complex representation of its complex dual group G(C). For any irreducible cuspidal automorphic representation σ of G(A), where A is the ring of adeles of k, in JL21, the authors introduce the (σ,)-Schwartz space Sσ,(A×) and (σ,)-Fourier operator Fσ,, and study the (σ,,)-Poisson summation formula on GL1, under the assumption that the local Langlands functoriality holds for the pair (G,) at all local places of k, where is a non-trivial additive character of k. Such general formulae on GL1, as a vast generalization of the classical Poisson summation formula, are expected to be responsible for the Langlands conjecture (L70) on global functional equation for the automorphic L-functions L(s,σ,). In order to understand such Poisson summation formulae, we continue with JL21 and develop a further local theory related to the (σ,)-Schwartz space Sσ,(A×) and (σ,)-Fourier operator Fσ,. More precisely, over any local field k of k, we define distribution kernel functions kσ,, (x) on GL1 that represent the (σ,)-Fourier operators Fσ,, as convolution integral operators, i.e. generalized Hankel transforms, and the local Langlands γ-functions γ(s,σ,,) as Mellin transform of the kernel function. As consequence, we show that any local Langlands γ-functions are the gamma functions in the sense of Gelfand, Graev, and Piatetski-Shapiro in GGPS.