פעילויות השבוע
קולוקוויום
Fixed-point properties for random groups
מרץ 29, 14:30—15:30, 2022, Math -101
מרצה
Izhar Oppenheim (BGU)
תקציר
A group is said to have a fixed-point property with respect to some class of metric spaces if any isometric action of the group on any space in the class admits a fixed point.
In this talk, I will focus on fixed-point properties with respect to (classes of) Banach spaces. I will survey some results regarding groups with and without these fixed-point properties and then present a recent result of mine regarding fix-point properties for random groups with respect to l^p spaces.
AGNT
Isogenous (non-)hyperelliptic CM Jacobians: constructions, results, and Shimura class groups. (-101)
מרץ 30, 16:00—17:15, 2022, -101
מרצה
Bogdan Adrian Dina (HUJI)
תקציר
Jacobians of CM curves are abelian varieties with a particularly large endomorphism algebra, which provides them with a rich arithmetic structure. The motivating question for the results in this talk is whether we can find hyperelliptic and non-hyperelliptic curves with maximal CM by a given order whose Jacobians are isogenous. Joint work with Sorina Ionica, and Jeroen Sijsling considers this question in genus 3 by using the catalogue of CM fields in the LMFDB, and found a (small) list of such isogenous Jacobians. This talk describes the main constructions, some results, and Shimura class groups.
BGU Probability and Ergodic Theory (PET) seminar
The rigidity of lattices in products of trees Online
מרץ 31, 11:10—12:00, 2022, -101
מרצה
Annette Karrer (Technion)
תקציר
Each complete CAT(0) space has an associated topological space, called visual boundary, that coincides with the Gromov boundary in case that the space is hyperbolic. A CAT(0) group G is called boundary rigid if the visual boundaries of all CAT(0) spaces admitting a geometric action by G are homeomorphic. If G is hyperbolic, G is boundary rigid. If G is not hyperbolic, G is not always boundary rigid. The first such example was found by Croke-Kleiner.
In this talk we will see that every group acting freely and cocompactly on a product of two regular trees of finite valence is boundary rigid. That means that every CAT(0) space that admits a geometric action of any such group has the boundary homeomorphic to a join of two copies of the Cantor set. The proof of this result uses a generalization of classical dynamics on boundaries introduced by Guralnik and Swenson. I will explain the idea of this generalization by explaining a higher-dimensional version of classical North-south-dynamics obtained this way.
This is a joint work with Kasia Jankiewicz, Kim Ruane and Bakul Sathaye.