Title: Grothendieck’s construction of Chern classes
Speaker: Martin Ortiz
Abstract: There are many settings and ways in which one can define Chern classes, in this talk I will present an axiomatic construction by Grothendieck which is particularly simple: it suffices to construct Chern classes for line bundles. The advantages of this construction is that it gives 3 simple properties that characterize Chern classes, hence makes it easier to compare the different constructions; and that it works both for smooth complex varieties and complex manifolds. The talk will be self contained, but being familiar with the line bundle-divisor correspondence in algebraic geometry will be useful (see e.g. Section 1.1 in Principles of Algebraic Geometry by Griffiths and Harris).
Some snacks will be provided before and after the talk.
This talk will be broadcasted via Zoom. Subscribe to the mailing list or contact organisers to get the Zoom details.
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