Moduli spaces of Hecke modifications for rational and elliptic curves

Abstract

We propose definitions of complex manifolds PM(X,m,n) that could potentially be used to construct the symplectic Khovanov homology of n-stranded links in lens spaces. The manifolds PM(X,m,n) are defined as moduli spaces of Hecke modifications of rank 2 parabolic bundles over an elliptic curve X. To characterize these spaces, we describe all possible Hecke modifications of all possible rank 2 vector bundles over X, and we use these results to define a canonical open embedding of PM(X,m,n) into Ms(X,m+n), the moduli space of stable rank 2 parabolic bundles over X with trivial determinant bundle and m+n marked points. We explicitly compute PM(X,1,n) for n=0,1,2. For comparison, we present analogous results for the case of rational curves, for which a corresponding complex manifold PM(CP1,3,n) is isomorphic for n even to a space Y(S2,n) defined by Seidel and Smith that can be used to compute the symplectic Khovanov homology of n-stranded links in S3.