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比利时vs摩洛哥足彩 ,
university of california san diego

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math 295 - mathematics colloquium

dimitri shlyakhtenko

ucla

free entropy dimension and the first $l^2$-betti number

abstract:

free entropy dimension and the first $l^2$ betti number are both numeric invariants of discrete groups; one comes from voiculescu’s free probability theory and is defined by using finite matrices to ``approximate’’ the group, while the other comes from geometric group theory and is of cohomological nature. somewhat surprisingly, the two numbers are related. i will describe this connection and talk about some applications to von neumann algebras.

host: adrian ioana

june 1, 2017

4:00 pm

ap&m 6402

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