Abstract
For a parameter λ > 0, we study a type of vortex equations, which generalize the well-known Hermitian–Einstein equation, for a connection A and a section φ of a holomorphic vector bundle E over a Kahler manifold X. We establish a global existence of smooth solutions to heat flow for a self-dual Yang–Mills–Higgs field on E. Assuming the λ-stability of (E, φ), we prove the existence of the Hermitian Yang–Mills–Higgs metric on the holomorphic bundle E by studying the limiting behaviour of the gauge flow.
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