Workshop on Recent Developments in Hodge Theory and O-minimality
(Quasi)-Periods Functions and Derivatives of Period Maps
Abstract: Given a family $X \rightarrow S$, one may consider the corresponding fiber-wise (quasi-) period integrals as (multi)-functions on S. Built out of these using a flag variety, one obtains variation of (mixed) hodge structures giving period map $S \rightarrow D/ \Gamma$. We study the question of whether one can recover the periods themselves using the period maps by taking derivatives. Specifically, we show that this is usually true (up to an algebraic closure) and explain when it fails. The proofs make use of o-minimality results. Joint work with Bakker and Pila.
Date & Time
March 11, 2026 | 4:00pm – 5:00pm
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03/11/2026 16:00
03/11/2026 17:00
Workshop on Recent Developments in Hodge Theory and O-minimality
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Topic: (Quasi)-Periods Functions and Derivatives of Period Maps
Speakers: Jacob Tsimerman, Institute for Advanced Study
More: https://www.ias.edu/math/events/workshop-recent-developments-hodge-theory-and-o-minimality-11
Abstract: Given a family $X \rightarrow S$, one may consider the
corresponding fiber-wise (quasi-) period integrals as
(multi)-functions on S. Built out of these using a flag variety, one
obtains variation of (mixed) hodge structures giving period map $S
\rightarrow D/ \Gamma$. We study the question of whether one can
recover the periods themselves using the period maps by taking
derivatives. Specifically, we show that this is usually true (up to an
algebraic closure) and explain when it fails. The proofs make use of
o-minimality results. Joint work with Bakker and Pila.
Simonyi Hall 101
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Location
Simonyi Hall 101Speakers
Jacob Tsimerman, Institute for Advanced Study