Let G be a locally compact group and U a unitary representation of a closed subgroup H of G on some Hilbert space. When does U extend to a unitary representation of G on the same space?

For normal subgroups N, Clifford answered this extension problem for finite-dimensional irreducible representations of discrete groups: there is an obstruction to extending the representation in the cohomology group H²(G/N,T), where T is the unit circle. Mackey extended Clifford's results to irreducible representations of locally compact groups: his obstruction lies in a cohomology theory where the cochains are Borel.

I will discuss how a circle of ideas from nonabelian duality for crossed products of C*-algebras is used to study this problem for arbitrary (i.e. not necessarily irreducible) representations.

This is joint work with Steven Kaliszewski, Iain Raeburn and Dana Williams.


	School of Mathematics and Statistics Algebra Seminar