Videos

Andrew Snowden - Oligomorphic groups and tensor categories - IPAM at UCLA

Presenter
January 10, 2024
Abstract
Recorded 10 January 2024. Andrew Snowden of the University of Michigan presents "Oligomorphic groups and tensor categories" at IPAM's Symmetric Tensor Categories and Representation Theory Workshop. Abstract: I will explain joint work with Nate Harman in which we attach a symmetric tensor category to an oligomorphic group G equipped with a measure mu. The simplest example is when G is the infinite symmetric group; in this case, there is a 1-parameter family of measures, and the resulting tensor categories are Deligne's interpolation categories Rep(S_t). Other choices for G lead to interesting new categories: for example, we obtain the first semi-simple pre-Tannakian category in positive characteristic with superexponential growth, and the first pre-Tannakian category with doubly exponential growth. Learn more online at: https://www.ipam.ucla.edu/programs/workshops/symmetric-tensor-categories-and-representation-theory/?tab=overview