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Topology of isoenergy surfaces of Kovalevskaya integrable case on the Lie algebra so(4)

Published 12 Dec 2019 in math.DS and math.GT | (1912.05536v1)

Abstract: In the paper we determine the class of diffeomorphism of three-dimensional regular common level surfaces of Hamiltonian and Casimir functions for the analog of Kovalevskaya case on Lie algebra $\textrm{so}(4)$. We start from Fomenko-Zieschang invariants of Lioville foliations on these manifolds that were calculated by the author earlier.

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