Branched projective structures, branched SO(3,C)-opers and logarithmic connections on jet bundle

Abstract

We study the branched holomorphic projective structures on a compact Riemann surface X with a fixed branching divisor S\, =\, Σi=1d xi, where xi \,∈\, X are distinct points. After defining branched SO(3, C)--opers, we show that the branched holomorphic projective structures on X are in a natural bijection with the branched SO(3, C)--opers singular at S. It is deduced that the branched holomorphic projective structures on X are also identified with a subset of the space of all logarithmic connections on J2((TX) OX(S)) singular over S, satisfying certain natural geometric conditions.