Parametric Gromov width of Liouville domains

Abstract

The classical Gromov width measures the largest symplectic ball embeddable into a symplectic manifold; inspired by the symplectic camel problem, we generalize this to ask how large a symplectic ball can be embedded as a family over a parameter space N. Given a smooth map f: N , where is a symplectic manifold, we define the parametric Gromov width Gr(f,) as the supremum of capacities a>0 for which there exists a family of balls, parametrized by N, of capacity a whose centers trace out the map f. For Liouville domains , we establish upper bounds on Gr(f,) using the Floer cohomology persistence module associated to . Specializing to fiberwise starshaped domains in the cotangent bundle T*M, we derive computable bounds via filtered string topology. Specific examples of -- including disk cotangent bundles of thin ellipsoids, open books, and tori -- demonstrate our bounds, and reveal constraints on parameterized symplectic embeddings beyond the classical Gromov width.

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