Explicit estimates on the measure of primary KAM tori
Abstract
From KAM Theory it follows that the measure of phase points which do not lie on Diophantine, Lagrangian, "primary" tori in a nearly--integrable, real--analytic Hamiltonian system is O(), if is the size of the perturbation. In this paper we discuss how the constant in front of depends on the unperturbed system and in particular on the phase--space domain.
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