Humbert singular relations and linear modular embeddings of modular and Shimura curves
Desirée Gijón Gómez
Inria - Nancy
https://sites.google.com/view/desiregijongomez/
Date(s) : 04/12/2025 iCal
11h00 - 12h00
Humbert singular relations are quadratic relations involving the coefficients of the period matrix of a principally polarized abelian surface (ppas), which inform on the existence of both real multiplications in the ring of symmetric endomorphisms and isogenies to products of elliptic curves. Ppas with quaternionic multiplication admit infinitely many real multiplications, which are encoded by a positive definite binary quadratic form, the refined Humbert invariant. We present the pertinent results (on the complex setting) of Kani, Lin-Yang, Guo-Yang, Hashimoto and Rotger, and apply them to study linear relations between the coefficients of the period matrix.
Emplacement
I2M Luminy - TPR2, Amphithéâtre Herbrand 130-134 (1er étage)
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