Floer cohomology of g-equivariant Lagrangian branes

Abstract

Building on Seidel-Solomon's fundamental work, we define the notion of a g-equivariant Lagrangian brane in an exact symplectic manifold M where g ⊂ SH1(M) is a sub-Lie algebra of the symplectic cohomology of M. When M is a (symplectic) mirror to an (algebraic) homogeneous space G/P, homological mirror symmetry predicts that there is an embedding of g in SH1(M). This allows us to study a mirror theory to classical constructions of Borel-Weil and Bott. We give explicit computations recovering all finite dimensional irreducible representations of sl2 as representations on the Floer cohomology of an sl2-equivariant Lagrangian brane and discuss generalizations to arbitrary finite-dimensional semisimple Lie algebras.