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Caltech

Algebraic Geometry Seminar

Monday, March 2, 2015
4:00pm to 5:00pm
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Rational Connectivity and Analytic Contractibility
Morgan Brown, Professor, Mathematics, University of Michigan,

Berkovich spaces are a natural setting for analysis on varieties over fields with non-archimedean valuation. They have been studied in a variety of contexts, including tropical geometry and number theory. I will give an introduction to Berkovich spaces, and explain recent connections between the theory of Berkovich spaces and the minimal model program. In particular, I will show that if $X$ is a rationally connected smooth projective variety over the Laurent series $\mathbb{C}((t))$, the Berkovich space is a contractible topological space. This is joint work with Tyler Foster.

For more information, please contact Pablo Solis by email at [email protected] or visit http://www.its.caltech.edu/~pablos/agsem.html.