Cohomology ring of the flag variety vs Chow cohomology ring of the Gelfand-Zetlin toric variety
Abstract
We compare the cohomology ring of the flag variety FLn and the Chow cohomology ring of the Gelfand-Zetlin toric variety XGZ. We show that H*(FLn, Q) is the Gorenstein quotient of the subalgebra L of A*(XGZ, Q) generated by degree 1 elements. We compute these algebras for n=3 to see that, in general, the subalgebra L does not have Poincare duality.
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