On the co--existence of maximal and whiskered tori for the planetary three--body problem

Abstract

In this paper we discuss about the possibility of coexistence of stable and unstable quasi--periodic kam tori in a region of phase space of the three-body problem. The argument of proof goes along kam theory and, especially, the production of two non smoothly related systems of canonical coordinates in the same region of the phase space, the possibility of which is foreseen, for `properly--degenerate' systems, by a theorem of Nekhorossev and Miscenko and Fomenko. The two coordinate systems are alternative to the classical reduction of the nodes by Jacobi, described, e.g., in~[V.I.~Arnold, Small denominators and problems of stability of motion in classical and celestial mechanics, 18, 85 (1963); p. 141].