Closed almost-K\"ahler 4-manifolds of constant non-negative Hermitian holomorphic sectional curvature are K\"ahler

Abstract

We show that a closed almost K\"ahler 4-manifold of globally constant holomorphic sectional curvature k≥ 0 with respect to the canonical Hermitian connection is automatically K\"ahler. The same result holds for k<0 if we require in addition that the Ricci curvature is J-invariant. The proofs are based on the observation that such manifolds are self-dual, so that Chern-Weil theory implies useful integral formulas, which are then combined with results from Seiberg--Witten theory.