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A canonical splitting of the Hodge filtration and applications to p-adic L-functions (1)

组织者

闫旗军

演讲者

Daniel Kriz

时间

2026年01月15日 13:30 至 14:30

地点

A6-101

线上

Zoom 815 762 8413 (BIMSA)

摘要

This is a two-part talk. In the first part, I will go over a construction of a functorial splitting of the p-adic Hodge filtration on first universal de Rham cohomology on Shimura curves which is defined over a large open neighborhood of the infinite-level Shimura curve and specializes to the unit root splitting on the ordinary locus. The construction of this splitting involves defining new period sheaves via completing OB_{dR} along ideals generated by explicit p-adic periods coming from the geometry of the tower of Shimura curves. Using these sheaves and this splitting, one can formulate new theories of p-adic modular forms and define differential operators acting on them which specialize to Katz's theory on the ordinary locus. In the second part of the talk, I will go over applications of these objects to constructions of Katz-type, Bertolini-Darmon-Prasanna-type and Liu-Zhang-Zhang-type p-adic L-functions for p inert or ramified in the CM field K, generalizing and unifying my and Andreatta-Iovita's previous work. I will also discuss special value formulas for these p-adic L-functions and their arithmetic applications, including Sylvester's conjecture on primes expressible as sums of rational cubes, showing 100% of positive squarefree integers congruent to 5,6,7 mod 8 are congruent numbers, and results toward Goldfeld's conjecture.