Peterson conjecture via Lagrangian correspondences and wonderful compactifications

Abstract

For a simply-connected compact semisimple Lie group G and its maximal torus T, we study the A∞-functor associated to the moment Lagrangian correspondence from the cotangent bundle T*G to the square G/T- × G/T. In particular, we compute the leading term of the A∞-homomorphism from the wrapped Floer cohomology HW*(T*e G, T*e G) of the cotangent fiber Te*G to the Floer cohomology HF*(, ) of the diagonal in the square G/T- × G/T by determining the count of certain pseudo-holomorphic quilts. As a consequence, we prove that the Floer cohomologies HW*(T*e G, T*e G) and HF*(,) are isomorphic as rings after a localization.