Doubly periodic monopoles and q-difference modules
Abstract
An interesting theme in complex differential geometry is to find a correspondence between algebraic objects and differential geometric objects. One of the most attractive is the non-abelian Hodge theory of Simpson. In this paper, pursuing an analogue of the non-abelian Hodge theory in the context of q-difference modules, we study Kobayashi-Hitchin correspondences between doubly periodic monopoles and parabolic q-difference modules, depending on twistor parameters.
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