Applications of the theory of Floer to symmetric spaces

Abstract

We quantize the problem considered by Bott-Samelson who applied Morse theory to any compact symmetric space G/K and the associated real flag manifold GR/B which is a real locus of a complex partial flag variety GC/Pσ. We prove that the Pontryagin ring H-*((G/K)) of the based loop space (G/K) is isomorphic to the Floer cohomology ring HF*(GR/B,GR/B) after localization. When G/K is a Lie group, this is a conjecture of Peterson, proved combinatorially by Lam-Shimozono, in the context of quantum cohomologies of complex flag varieties. Our approach is geometric in nature: we construct a Lagrangian correspondence from T*(G/K) to GC/Pσ which geometrically composes with a cotangent fiber to GR/B, and compute the linear part of the associated Ma'u-Wehrheim-Woodward's A∞ homomorphism from a Floer model of (G/K) to CF*(GR/B,GR/B). The crux is to make use of the geometry of G/K to construct specific perturbation data which enables us to reduce the computations to the case when G/K is a torus.