Parabolic vector bundles on Klein surfaces

Abstract

Given a discrete subgroup of finite co-volume of PGL(2,R), we define and study parabolic vector bundles on the quotient of the (extended) hyperbolic plane by . If contains an orientation-reversing isometry, then the above is equivalent to studying real and quaternionic parabolic vector bundles on the orientation cover of . We then prove that isomorphism classes of polystable real and quaternionic parabolic vector bundles are in bijective correspondence with equivalence classes of real and quaternionic unitary representations of . Similar results are obtained for compact-type real parabolic vector bundles over Klein surfaces.