Almost complex structure and the quotient four-manifold by an anti-symplectic involution

Suppose that X is a closed, symplectic four-manifold with an anti-symplectic involution σ and its two-dimensional fixed point set. We show that the quotient X/σ admits no almost complex structure if .As a partial converse if X is simply-connected and , then the X/σ admits an almost complex structure.Also we show that the quotient X/σ admits an almost complex structure if X is Kähler and .