Mathematics Department

Operator Algebras and Dynamics Seminar

Fall 2016

All talks are from 3:45-4:45 p.m. in the Seminar room, unless otherwise specified.

  • Nov
    04
  • TBA
    Peter Nandori
    University of Maryland
    Time: 03:45 PM
  • Oct
    21
  • TBA
    Jason Hindes
    Naval Research Laboratory
    Time: 03:45 PM
  • Sep
    12
  • Metric on regular languages using topological entropy
    Kelly Yancey
    Institute for Defense Analyses - Center for Computing Sciences
    Time: 03:45 PM

    View Abstract

    A problem that has emerged in computer science is determining the similarity between regular languages. We will represent a regular language by a deterministic finite automata (a directed graph with some marked data) and then use ideas from symbolic dynamics to develop a metric between the languages. We will also discuss other distances based on the classical Jaccard distance and how they are related to the topological entropy of a regular language. There will be no prior knowledge of automata theory assumed.
  • Aug
    26
  • Character Rigidity for Lattices in Lie Groups
    Darren Creutz
    USNA
    Location: CH320
    Time: 03:45 PM

    View Abstract

    Characters on groups (positive definite conjugation-invariant functions) arise naturally both from probability-preserving actions (the measure of the set of fixed points) and unitary representations on finite factors (the trace); the classical theory of characters is the first step in the classification of finite simple groups and culminates in the Peter-Weyl theorem for compact groups. I will present the results of J. Peterson and myself that the only characters on lattices in semisimple groups are the left-regular character and the classical characters. This is in actuality operator-algebraic superrigidity for lattices, answering a question of Connes. The main idea is to bring dynamics into the operator-algebraic picture; the second half of the talk will focus on the ergodic-theoretic ideas of contractiveness and the Poisson boundary and how these ideas lead to operator-algebraic results.
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