Infinitely many non-isotopic real symplectic forms on S2 × S2

Abstract

Let (S2,ω) be a symplectic sphere, and let τ S2 S2 be an anti-symplectic involution of (S2,ω). We consider the product (S2,ω) × (S2,ω) endowed with the anti-symplectic involution τ × τ, and study the space of monotone anti-invariant symplectic forms on this four-manifold. We show that this space is disconnected. In addition, during the course of the proof, we produce a diffeomorphism of the grassmannian (2,4) which induces the identity map on all homology and homotopy groups, but which is not homotopic to the identity.