Infinitesimal deformations of parabolic connections and parabolic opers

Abstract

We compute the infinitesimal deformations of quadruples of the form (X, S, E*, D), where (X, S) is a compact Riemann surface with n marked points, E* is a parabolic vector bundle on X with parabolic structure over S, and D is a parabolic connection on E*. Using it we compute the infinitesimal deformations of (X, S, D), where D is a parabolic SL(r, C)-oper on (X, S). It is shown that the monodromy map, from the moduli space of triples (X, S, D), where D is a parabolic SL(r, C)-oper on (X, S), to the SL(r, C)-character variety of X - S, is an immersion.