Almost-K\"ahler smoothings of compact complex surfaces with A1 singularities

Abstract

This paper is concerned with the existence of metrics of constant Hermitian scalar curvature on almost-K\"ahler manifolds obtained as smoothings of a constant scalar curvature K\"ahler orbifold, with A1 singularities. More precisely, given such an orbifold that does not admit nontrivial holomorphic vector fields, we show that an almost-K\"ahler smoothing (M, ω) admits an almost-K\"ahler structure ( J, g) of constant Hermitian curvature. Moreover, we show that for >0 small enough, the (M, ω) are all symplectically equivalent to a fixed symplectic manifold ( M, ω) in which there is a surface S homologous to a 2-sphere, such that [S] is a vanishing cycle that admits a representant that is Hamiltonian stationary for g.