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First order rigidity of higher rank arithmetic lattices (note the nonstandard day)

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  • UserChen Meiri (Technion, Haïfa)
  • ClockMonday 05 March 2018, 13:45-15:00
  • HouseCMS, MR13.

If you have a question about this talk, please contact Maurice Chiodo.

In this talk we will show that many higher-rank characteristic zero arithmetic lattices are first order rigid, i.e., if G is such a group and H is a finitely generated group which is elementarily equivalent to G then H is isomorphic to G.

This talk is part of the Geometric Group Theory (GGT) Seminar series.

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