A compactness result is established for gradient flow lines in a unified Morse-Floer framework, relying on two conditions including a new exponential decay estimate for Floer cylinders.
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math.SG 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
An abstract perturbation theorem for Fredholm sections on compact zero sets that preserves existing transversality and supports cobordism arguments, shown via re-proof of Schwarz's theorem on Hamiltonian action functionals.
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Compactness of Moduli Spaces of Gradient Flow Lines in the Uniform Topology
A compactness result is established for gradient flow lines in a unified Morse-Floer framework, relying on two conditions including a new exponential decay estimate for Floer cylinders.
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An Abstract Perturbation Theorem for Compact Moduli Spaces
An abstract perturbation theorem for Fredholm sections on compact zero sets that preserves existing transversality and supports cobordism arguments, shown via re-proof of Schwarz's theorem on Hamiltonian action functionals.