Parabolic Kazhdan-Laumon and the Kloosterman Fourier Transform for Quadric Cones

Abstract

Let G be a split reductive group over Fq, and let M be a standard Levi subgroup of G. Let ParM(G) denote the set of parabolic subgroups of G with Levi factor M. For P and P' in ParM(G), we let U=Ru(P) and U'=Ru(P') denote the unipotent radicals, and we denote by G/U and G/U' the affinizations of the corresponding homogeneous spaces. Extending the work of Kazhdan-Laumon and Braverman-Kazhdan (arXiv:math/9809112, arXiv:math/0206119) to general parabolic basic affine, or paraspherical, spaces, we propose a construction for certain intertwining operators FP',P: S(G/U(Fq),C) S(G/U'(Fq),C) for suitable function spaces S, defined via kernels analogous to those appearing in those works. We then study the extent to which these intertwiners are normalized. We show that, for opposite (n-1)+1 parabolics of SLn, our transform reduces to the classical linear Fourier transform, and that, for opposite unipotents in SL3 or opposite Siegel parabolics in Sp4, our transforms are given by a Fourier transform on a quadric cone, with kernel coming from a Kloosterman sum. We prove Fourier inversion for this transform on a natural subclass of functions on the quadric cone, establishing a finite-field analogue of the quadric Fourier transform of Gurevich-Kazhdan, Getz-Hsu-Leslie, and Kobayashi-Mano (arXiv:2304.13993, arXiv:2103.10261, arXiv:0712.1769).