Quantum characteristic classes, moment correspondences and the Hamiltonian groups of coadjoint orbits

Abstract

For any coadjoint orbit G/L, we determine all useful terms of the associated Savelyev-Seidel morphism defined on H-*( G). Immediate consequences are: (1) the dimension of the kernel of the natural map π*(G) Q→ π*(Ham(G/L)) Q is at most the semi-simple rank of L, and (2) the Bott-Samelson cycles in G which correspond to Peterson elements are solutions to the min-max problem for Hofer's max-length functional on Ham(G/L). The proof is based on Bae-Chow-Leung's recent computation of Ma'u-Wehrheim-Woodward morphism for the moment correspondence associated to G/T where T is a maximal torus, the computation of Abbondandolo-Schwarz isomorphism for G, and two theoretical results including the coincidence of the above Savelyev-Seidel and Ma'u-Wehrheim-Woodward morphisms, and a Leray-type spectral sequence relating Savelyev-Seidel morphisms for G/L and G/T. These ingredients also allow us to obtain an alternative proof of Peterson-Woodward's comparison formula which relates the quantum cohomology of G/T to that of G/L.