Removing parametrized rays symplectically

Abstract

Extracting isolated rays from a symplectic manifold result in a manifold symplectomorphic to the initial one. The same holds for higher dimensional parametrized rays under an additional condition. More precisely, let (M,ω) be a symplectic manifold. Let [0,∞)× Q⊂R× Q be considered as parametrized rays [0,∞) and let :[-1,∞)× Q M be an injective, proper, continuous map immersive on (-1,∞)× Q. If for the standard vector field ∂∂ t on R and any further vector field tangent to (-1,∞)× Q the equation *ω(∂∂ t,)=0 holds then M and M ([0,∞)× Q) are symplectomorphic.