Toric degenerations and symplectic geometry of smooth projective varieties

Abstract

Let X be an n-dimensional smooth complex projective variety embedded in CPN. We construct a smooth family X over C with an embedding in CPN × C whose generic fiber is X and the special fiber is the torus (C*)n sitting in CPN via a monomial embedding. We use this to show that if ω is an integral K\"ahler form on X then for any ε > 0 there is an open subset Uε ⊂ X such that vol(X Uε) < ε and Uε is symplectomorphic to (C*)n equipped with a (rational) toric K\"ahler form. As an application we obtain lower bounds for the Gromov width of (X, ω) in terms of its associated Newton-Okounkov bodies. We also show that if ω lies in the class c1(L) of a very ample line bundle L then (X, ω) has a full symplectic packing with d equal balls where d is the degree of (X, L).