An infinitesimal variant of Guo-Jacquet trace formula I: the case of (GL2n,D, GL
n,D × GLn,D

Li, Huajie

doi:10.25537/dm.2022v27.315-381

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An infinitesimal variant of Guo-Jacquet trace formula I: the case of (GL_2n,D, GL_n,D × GL_n,D

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Li, Huajie
Max Planck Institute for Mathematics, Max Planck Society;

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Citation

Li, H. (2022). An infinitesimal variant of Guo-Jacquet trace formula I: the case of (GL_2n,D, GL_n,D × GL_n,D. Documenta Mathematica, 27, 315-382. doi:10.25537/dm.2022v27.315-381.

Cite as: https://hdl.handle.net/21.11116/0000-000A-A9FD-B

Abstract

We establish an infinitesimal variant of Guo-Jacquet trace formula for the case of $(GL_{2n,D}, GL_{n,D}\times GL_{n,D})$. It is a kind of Poisson summation formula obtained by an analogue of Arthur's truncation process. It consists in the equality of the sums of two types of distributions which are non-equivariant in general: one type is associated to rational points in the categorical quotient, while the other type is the Fourier transform of the first type. For regular semi-simple points in the categorical quotient, we obtain weighted orbital integrals.