Defines DG-coefficient Floer homology, builds associated tools including symplectic homology and spectral invariants, and proves a Viterbo isomorphism for cotangent bundles with applications to almost existence of contractible closed characteristics.
On the action spectrum for closed symplectically aspherical manifolds
2 Pith papers cite this work. Polarity classification is still indexing.
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math.SG 2years
2024 2verdicts
UNVERDICTED 2representative citing papers
A3-configurations of exact Lagrangian spheres imply quasi-isometric embeddings of infinite-dimensional l^∞ spaces into Hofer-metric Lagrangian spaces and into Ham_c(M).
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Floer Homology with DG Coefficients. Applications to cotangent bundles
Defines DG-coefficient Floer homology, builds associated tools including symplectic homology and spectral invariants, and proves a Viterbo isomorphism for cotangent bundles with applications to almost existence of contractible closed characteristics.
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Hofer geometry of $A_3$-configurations
A3-configurations of exact Lagrangian spheres imply quasi-isometric embeddings of infinite-dimensional l^∞ spaces into Hofer-metric Lagrangian spaces and into Ham_c(M).