Local middle dimensional symplectic non-squeezing in the analytic setting

Abstract

We prove the following middle-dimensional non-squeezing result for analytic symplectic embeddings of domains in R2n. Let : D R2n be an analytic symplectic embedding of a domain D ⊂ R2n and P be a symplectic projector onto a linear 2k-dimensional symplectic subspace V⊂ R2n. Then there exists a positive function r0:D→ (0,+ ∞), bounded away from 0 on compact subsets K ⊂ D, such that the inequality Vol2k(P (Br(x)),ω k 0|V)≥ πk r2k holds for every x ∈ D and for every r < r0(x). This claim will be deduced from an analytic middle-dimensional non-squeezing result (stated by considering paths of symplectic embeddings) whose proof will be carried on by taking advantage of a work by \'Alvarez Paiva and Balacheff.