We construct absolute and relative versions of Hamiltonian Floer homology
algebras for strongly semi-positive compact symplectic manifolds with convex
boundary, where the ring structures are given by the appropriate versions of
the pair-of-pants products. We establish the absolute and relative
Piunikhin-Salamon-Schwarz isomorphisms between these Floer homology algebras
and the corresponding absolute and relative quantum homology algebras. As a
result, the absolute and relative analogues of the spectral invariants on the
group of compactly supported Hamiltonian diffeomorphisms are defined.Comment: 29 pages. The final version appeared in Beitr\"age zur Algebra und
  Geometrie / Contributions to Algebra and Geometry. Version 3 is the last
  arxiv version: various corrections and clarifications were made, references
  were adde

Lanzat, Sergei

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arXiv

Abstract. We construct absolute and relative versions of Hamiltonian Floer ho-mology algebras for strongly semi-positive compact symplectic manifolds with con-vex boundary, where the ring structures are given by the appropriate versions of the pair-of-pants products. We establish the absolute and relative Piunikhin–Salamon– Schwarz isomorphisms between these Floer homology algebras and the corresponding absolute and relative quantum homology algebras. As a result, the absolute and relative analogues of the spectral invariants on the group of compactly supported Hamiltonian diffeomorphisms are defined. 1. Introduction. In [14] U. Frauenfelder and F. Schlenk defined the Floer homology for weakly exact compact convex symplectic manifolds. The authors also established the Piunikhin– Salamon–Schwarz (PSS) isomorphism between the ring of Floer homology and the ring of Morse homology of such manifolds. This in turn led to the construction o

Hamiltonian Floer homology for compact convex symplectic manifolds

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