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Kudla–Rapoport cycles and derivatives of local densities

Chao Li, Wei Zhang

2021Journal of the American Mathematical Society29 citationsDOI

Abstract

We prove the local Kudla–Rapoport conjecture, which is a precise identity between the arithmetic intersection numbers of special cycles on unitary Rapoport–Zink spaces and the derivatives of local representation densities of hermitian forms. As a first application, we prove the global Kudla–Rapoport conjecture, which relates the arithmetic intersection numbers of special cycles on unitary Shimura varieties and the central derivatives of the Fourier coefficients of incoherent Eisenstein series. Combining previous results of Liu and Garcia–Sankaran, we also prove cases of the arithmetic Siegel–Weil formula in any dimension.

Topics & Concepts

MathematicsConjectureUnitary stateHermitian matrixPure mathematicsIntersection (aeronautics)Dimension (graph theory)Eisenstein seriesQuaternionRepresentation (politics)Algebra over a fieldSeries (stratigraphy)GeometryModular formLawEngineeringPoliticsBiologyPaleontologyPolitical scienceAerospace engineeringAdvanced Algebra and GeometryAlgebraic Geometry and Number TheoryAdvanced Mathematical Identities