A formally Kahler structure on a knot space of a G2-manifold

Abstract

A knot space in a manifold M is a space of oriented immersions from a circle S1 to M up to Diff(S1). Brylinski has shown that a knot space of a Riemannian threefold is formally Kahler. We prove that a space of knots in a holonomy G2 manifold is formally Kahler.