Deformative Magnetic Marked Length Spectrum Rigidity
Abstract
Let M be a closed surface and let \gs \ | \ s ∈ (-ε, ε)\ be a smooth one-parameter family of Riemannian metrics on M. Also let \s : M → R \ | \ s ∈ (-ε, ε)\ be a smooth one-parameter family of functions on M. Then the family \(gs, s) \ | \ s ∈ (-ε, ε)\ gives rise to a family of magnetic flows on TM. We show that if the magnetic curvatures are negative for s ∈ (-ε, ε) and the lengths of each periodic orbit remains constant as the parameter s varies, then there exists a smooth family of diffeomorphisms \fs : M → M \ | \ s ∈ (-ε, ε)\ such that fs*(gs) = g0 and fs*(s) = 0. This generalizes a result of Guillemin and Kazhdan to the setting of magnetic flows.
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