Real Slices of SL(r,C)-Opers
Abstract
Through the action of an anti-holomorphic involution σ (a real structure) on a Riemann surface X, we consider the induced actions on SL(r,C)-opers and study the real slices fixed by such actions. By constructing this involution for different descriptions of the space of SL(r,C)-opers, we are able to give a natural parametrization of the fixed point locus via differentials on the Riemann surface, which in turn allows us to study their geometric properties.
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