Barcode growth for toric-integrable Hamiltonian systems

Abstract

We continue investigating the connection between the dynamics of a Hamiltonian system and the barcode growth of the associated Floer or symplectic homology persistence module, focusing now on completely integrable systems. We show that for convex/concave or real analytic toric domains and convex/concave or real analytic completely integrable Hamiltonians on closed toric manifolds the barcode has polynomial growth with degree (i.e., slow barcode entropy) not exceeding half of the dimension. This slow polynomial growth contrasts with exponential growth for many systems with sufficiently non-trivial dynamics. We also touch upon the barcode growth function as an invariant of the interior of the domain and use it to distinguish some open domains.

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