Peterson-Lam-Shimozono's theorem is an affine analogue of quantum Chevalley formula
Abstract
We give a new proof of an unpublished result of Dale Peterson, proved by Lam and Shimozono, which identifies explicitly the structure constants, with respect to the quantum Schubert basis, for the T-equivariant quantum cohomology QHT(G/P) of any flag variety G/P with the structure constants, with respect to the affine Schubert basis, for the T-equivariant Pontryagin homology HT(Gr) of the affine Grassmannian Gr of G, where G is any simple simply-connected complex algebraic group. Our approach is to construct an HT(pt)-algebra homomorphism by Gromov-Witten theory and show that it is equal to Peterson's map. More precisely, the map is defined via Savelyev's generalized Seidel representations which can be interpreted as certain Gromov-Witten invariants with input HT(Gr) QHT(G/P). We determine these invariants completely, in a way similar to how Fulton and Woodward did in their proof of quantum Chevalley formula.
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