Non-Abelian Fourier Transforms and Normalized Intertwining Operators for General Parabolics over Finite Fields, and the Kloosterman Fourier Transform for Quadric Cones (2410.17476v1)

Abstract: Let $G$ be a (split) reductive group over $\mathbb{F}q$, and let $M$ be a standard Levi subgroup of $G$. Consider $P$ and $P'$ parabolics in $G$, containing $M$, with Levi factor $M$. we let $U = R_u(P)$ (resp., $U' = R_u(P')$) denote the unipotent radical; and we denote by $\overline{G/U}$ (resp., $\overline{G/U'}$) the affinization of the corresponding homogeneous space. Extending the work of Braverman-Kazhdan ( arXiv:9809.112 , arXiv:0206.119 ) to general parabolic basic affine (or ``paraspherical") space, we propose a construction for certain intertwining operators $F{P',P}: S(\overline{G/U}(\mathbb{F}_q), \mathbb{C}) \to S(\overline{G/U'}(\mathbb{F}_q), \mathbb{C})$ for a suitable function spaces $S$, defined via kernels analogous to those appearing (loc. cit.). We then study the extent to which these intertwiners are normalized. We show that, for opposite $(n-1)+1$ parabolics of $\textrm{SL}_n$, our transform reduces to the classical linear Fourier transform; and that, for opposite unipotents in $\textrm{SL}_3$ or opposite Siegel parabolics in $\textrm{Sp}_4$, 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 arXiv:2304.13993 and Getz-Hsu-Leslie arXiv:2103.10261.