A differential topology proof that the SU(2) character variety of the genus two surface is homeomorphic to C P3

Abstract

We provide a proof that the SU(2) character variety of a genus two surface, (F2), is a closed compact manifold, and a proof of the Narasimhan-Ramanan theorem that (F2) is homeomorphic to C P3. This is done entirely in the language of SU(2) representations, differential topology and elementary algebraic topology. It avoids the Narasimhan-Seshadri correspondence, clarifying the nature of Lagrangian immersions into (F2) induced by 3-manifolds with genus two boundary. We give examples of such Lagrangian immersions and describe a correspondence from multicurves in the pillowcase to Lagrangian immersions in (F2), induced by a 2-stranded tangle in a punctured genus 2 handlebody. We give an example of a non-transverse pair of smooth Lagrangians in (F2) induced by a genus 2 Heegaard splitting of (S3,W) for the ``linked eyeglasses" web W, which are made transverse, and hence the corresponding Chern-Simons function Morse, using Goldman flows/holonomy perturbations along embedded curves in the Heegaard surface.