Z-critical equations for holomorphic vector bundles on K\"ahler surfaces

Abstract

We prove that the existence of a Z-positive and Z-critical Hermitian metric on a rank 2 holomorphic vector bundle over a compact K\"ahler surface implies that the bundle is Z-stable. As particular cases, we obtain stability results for the deformed Hermitian Yang-Mills equation and the almost Hermite-Einstein equation for rank 2 bundles over surfaces. We show examples of Z-unstable bundles and Z-critical metrics away from the large volume limit.

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