The Steep Nekhoroshev's Theorem
Abstract
Revising Nekhoroshev's geometry of resonances, we provide a fully constructive and quantitative proof of Nekhoroshev's theorem for steep Hamiltonian systems proving, in particular, that the exponential stability exponent can be taken to be 1/ (2n α1·sαn-2) (αi's being Nekhoroshev's steepness indices and n 3 the number of degrees of freedom).
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