Limiting behavior of Donaldson's heat flow on non-K\"ahler surfaces
Abstract
Let X be a compact Hermitian surface, and g be any fixed Gauduchon metric on X. Let E be an Hermitian holomorphic vector bundle over X. On the bundle E, Donaldson's heat flow is gauge equivalent to a flow of holomorphic structures. We prove that this flow converges, in the sense of Uhlenbeck, to the double dual of the graded sheaf associated to the g-Harder-Narasimhan-Seshadri filtration of X. This result generalizes a convergence theorem of Daskalopoulos and Wentworth to non-K\"ahler setting.
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