Similarity Problems: Which Groups Are Unitarizable?
Abstract
This thesis covers some theory on similarity of group representations to unitary representations.
We discuss the notion of amenability and give some classes of groups that are amenable. We then
prove the Dixmier-Day theorem, that states that a locally compact group G is unitarizable if it is
amenable. We also investigate the converse of this statement, which is still an open problem. We
will give some statements where we make some assumptions on the similarity that are equivalent
to amenability. We will also investigate when bounded algebra homomorphism A → B(H), where
A is a C∗-algebra, are similar to a *-homomorphism. We will present connections between the
unitarizability of groups and unitarizability of group C∗-algebras, and this will be useful for some
results about the converse of the Dixmier-Day theorem. We will also investigate the notions of
completely positive and completely bounded maps and prove Stinespring’s theorem for completely
positive maps followed by Wittstock’s theorem for completely bounded maps. We then prove
Haagerup’s theorem that states that unitarizability of homomorphisms is equivalent to the property
of being completely bounded.
Degree
Student essay
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Date
2024-08-20Author
Westlund, Tim
Keywords
amenability, completely bounded maps, Dixmier-Day theorem, Haagerups theorem, Kadison’s problem, unitarizable groups, unitarizable representations
Language
eng