Abstract:Continuing our previous work on the integral Arnold conjecture, we establish the foundation of Hamiltonian Floer theory over integer coefficients on any compact symplectic manifold. This package produces a well-defined chain homotopy class of Floer complexes, chain-level continuation maps, the Piunikhin--Salamon--Schwarz (PSS) isomorphism, and an associative pair-of-pants product. When the Hamiltonian is the $p$-th iteration for a prime number $p$, we also establish the $\mathbb{Z}/p$-equivariant Floer theory in characteristic $p$, including the equivariant Floer complex and the $\mathbb{Z}/p$-equivariant pair-of-pants product. Moreover, we define quantum Steenrod operations for any compact symplectic manifold and compare them with the equivariant pair-of-pants products via the $\mathbb{Z}/p$-equivariant PSS map. We also obtain chain-level invariants such as spectral numbers and barcodes, and prove quantitative properties of the equivariant pair-of-pants product.
The counting theory is based on Fukaya-Ono's normally polynomial perturbation scheme and its realization by the authors, termed FOP perturbations, adapted in the abstract setting of flow categories, flow multimodules, and homotopies of flow bimodules. Along the way, we construct global Kuranishi charts for the relevant moduli spaces following Abouzaid-McLean-Smith's framework and its adaptation to the Hamiltonian Floer setting due to the authors, which may be of independent interest.
From: Shaoyun Bai [view email]
[v1]
Sun, 14 Jun 2026 15:02:33 UTC (557 KB)
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