Contact non-squeezing at large scale via generating functions

Abstract

Using SFT techniques, Eliashberg, Kim and Polterovich (2006) proved that if π R22 ≤ K ≤ π R12 for some integer K then there is no contact squeezing in R2n × S1 of the prequantization of the ball of radius R1 into the prequantization of the ball of radius R2. This result was extended to the case of balls of radius R1 and R2 with 1 ≤ π R22 ≤ π R12 by Chiu (2017) and the first author (2016), using respectively microlocal sheaves and SFT. In the present article we recover this general contact non-squeezing theorem using generating functions, a classical method based on finite dimensional Morse theory. More precisely, we develop an equivariant version, with respect to a certain action of a finite cyclic group, of the generating function homology for domains of R2n × S1 defined by the second author (2011). A key role in the construction is played by translated chains of contactomorphisms, a generalization of translated points.

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