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作 者:Jayce Robert Getz Baiying Liu
机构地区:[1]Department of Mathematics,Duke University,Durham,NC 27708,USA [2]Department of Mathematics,Purdue University,West Lafayette,IN 47907,USA
出 处:《Science China Mathematics》2021年第6期1127-1156,共30页中国科学:数学(英文版)
基 金:supported by the National Science Foundation of the USA(Grant Nos.DMS-1405708 and DMS-1901883);supported by the National Science Foundation of the USA(Grant Nos.DMS-1702218 and DMS-1848058);a start-up fund from the Department of Mathematics at Purdue University。
摘 要:Braverman and Kazhdan(2000)introduced influential conjectures aimed at generalizing the Fourier transform and the Poisson summation formula.Their conjectures should imply that quite general Langlands L-functions have meromorphic continuations and functional equations as predicted by Langlands'functoriality conjecture.As an evidence for their conjectures,Braverman and Kazhdan(2002)considered a setting related to the so-called doubling method in a later paper and proved the corresponding Poisson summation formula under restrictive assumptions on the functions involved.The connection between the two papers is made explicit in the work of Li(2018).In this paper,we consider a special case of the setting in Braverman and Kazhdan's later paper and prove a refined Poisson summation formula that eliminates the restrictive assumptions of that paper.Along the way we provide analytic control on the Schwartz space we construct;this analytic control was conjectured to hold(in a slightly different setting)in the work of Braverman and Kazhdan(2002).
关 键 词:Braverman-Kazhdan program generalized Fourier transforms generalized Poisson summation spherical varieties
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