Logic Seminar
Isaac Goldbring
UIC
The model-theoretic content of a result of Junge and Pisier
Abstract: An operator space is a norm closed linear subspace of the Banach space B(H) of bounded linear operators on a Hilbert space. For reasons that will be explained in this talk, operator spaces are the noncommutative analogs of Banach spaces. A fundamental result of Junge and Pisier shows that there are many more operator spaces than there are Banach spaces in a way to be made precise in the talk. I will explain the model-theoretic content of their result. Parts of this talk represent joint work with Martino Lupini and other parts represent joint work with Thomas Sinclair.
Tuesday March 3, 2015 at 4:00 PM in SEO 427