ECH embedding obstructions for rational surfaces

Abstract

Let (Y,A) be a smooth rational surface or a possibly singular toric surface with ample divisor A. We show that a family of ECH-based, algebro-geometric invariants calgk(Y,A) proposed by Wormleighton obstruct symplectic embeddings into Y. Precisely, if (X,ωX) is a 4-dimensional star-shaped domain and ωY is a symplectic form Poincar\'e dual to [A] then \[(X,ωX) embeds into (Y,ωY) symplectically cECHk(X,ωX) calgk(Y,A)\] We give three applications to toric embedding problems: (1) these obstructions are sharp for embeddings of concave toric domains into toric surfaces; (2) the Gromov width and several generalizations are monotonic with respect to inclusion of moment polygons of smooth (and many singular) toric surfaces; and (3) the Gromov width of such a toric surface is bounded by the lattice width of its moment polygon, addressing a conjecture of Averkov--Hofscheier--Nill.