Effective computations for weakly optimal subvarieties

Gal Binyamini; Christopher Daw

doi:10.4171/JEMS/1408

Effective computations for weakly optimal subvarieties

Gal Binyamini, Christopher Daw

Department of Mathematics

Weizmann Institute of Science

Research output: Contribution to journal › Article › peer-review

Abstract

Ren and the second author established that the weakly optimal subvarieties (e.g. maximal weakly special subvarieties) of a subvariety V of a Shimura variety arise in finitely many families. In this article, we refine this theorem by (1) constructing a finite collection of algebraic families whose fibres are precisely the weakly optimal subvarieties of V; (2) obtaining effective degree bounds on the weakly optimal locus and its individual members; (3) describing an effective procedure to determine the weakly optimal locus.

Original language	English
Pages (from-to)	2155-2186
Number of pages	32
Journal	Journal of the European Mathematical Society
Volume	27
Issue number	5
Early online date	9 Jan 2024
DOIs	https://doi.org/10.4171/JEMS/1408
State	Published - 9 Apr 2025

All Science Journal Classification (ASJC) codes

General Mathematics
Applied Mathematics

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AB - Ren and the second author established that the weakly optimal subvarieties (e.g. maximal weakly special subvarieties) of a subvariety V of a Shimura variety arise in finitely many families. In this article, we refine this theorem by (1) constructing a finite collection of algebraic families whose fibres are precisely the weakly optimal subvarieties of V; (2) obtaining effective degree bounds on the weakly optimal locus and its individual members; (3) describing an effective procedure to determine the weakly optimal locus.

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JO - Journal of the European Mathematical Society

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Effective computations for weakly optimal subvarieties

Abstract

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