Almost Complex Structures on S2× S2
Abstract
In this note we investigate the structure of the space of smooth almost complex structures on S2× S2 that are compatible with some symplectic form. This space has a natural stratification that changes as the cohomology class of the form changes and whose properties are very closely connected to the topology of the group of symplectomorphisms of S2× S2. By globalizing standard gluing constructions in the theory of stable maps, we show that the strata of are Fr\'echet manifolds of finite codimension, and that the normal link of each stratum is a finite dimensional stratified space. The topology of these links turns out to be surprisingly intricate, and we work out certain cases. Our arguments apply also to other ruled surfaces, though they give complete information only for bundles over S2 and T2.
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