Tristan C. Collins, Adam Jacob
Published 2012-06-28, updated 2013-09-30Version 3
We study the Yang-Mills flow on a holomorphic vector bundle E over a compact Kahler manifold X. We construct a natural barrier function along the flow, and introduce some techniques to study the blow-up of the curvature along the flow. Making some technical assumptions, we show how our techniques can be used to prove that the curvature of the evolved connection is uniformly bounded away from an analytic subvariety determined by the Harder-Narasimhan-Seshadri filtration of E. We also discuss how our assumptions are related to stability in some simple cases.
Comments: We found a mistake in the proof of Proposition 4. The paper has been completely rewritten. The title and abstract have been altered to reflect the changes. 26 pages
Asymptotics of the Yang-Mills Flow for Holomorphic Vector Bundles Over Kähler Manifolds: The Canonical Structure of the Limit
The Yang-Mills flow and the Atiyah-Bott formula on compact Kahler manifolds
Uhlenbeck compactness for Yang-Mills flow in higher dimensions
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