Stable Higgs bundles and Hermitian-Einstein metrics on non-K\"ahler manifolds
Abstract
Let X be a compact Gauduchon manifold, and let E and V0 be holomorphic vector bundles over X. Suppose that E is stable when considering all subsheaves preserved by a Higgs field θ∈ H0(End(E) V0). Then a modified version of the Donaldson heat flow converges along a subsequence of times to a solution of a generalized Hermitian-Einstein equation, given by i F+[θ,θ]=λ I.
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