The Geometry of Grassmannians and Flag varieties
Izzet Coskun, MIT
Abstract: A Littlewood-Richardson rule is a positive rule for
computing the structure constants of the cohomology ring of flag varieties
with respect to their Schubert basis. In recent years new geometric
Littlewood-Richardson rules have led to the solution of many
important problems, including Klyachko, Knutson and Tao's solution of Horn's
conjecture and Vakil's solution of the reality of Schubert
calculus. In this talk I will survey some of the basic geometric ideas that
underlie geometric Littlewood-Richardson rules.
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