Symplectic Structures on the cotangent bundles of open 4-manifolds

Abstract

We show that, for any two orientable smooth open 4-manifolds X0,X1 which are homeomorphic, their cotangent bundles T*X0,T*X1 are symplectomorphic with their canonical symplectic structure. In particular, for any smooth manifold R homeomorphic to R4, the standard Stein structure on T*R is Stein homotopic to the standard Stein structure on T*R4 = R8. We use this to show that any exotic R4 embeds in the standard symplectic R8 as a Lagrangian submanifold. As a corollary, we show that R8 has uncountably many smoothly distinct foliations by Lagrangian R4s with their standard smooth structure.