On invariant tori in some reversible systems

Abstract

In the present paper, we consider the following reversible system equation* cases x=ω0+f(x,y),\\ y=g(x,y), cases equation* where x∈Td, y0∈ Rd, ω0 is Diophantine, f(x,y)=O(y), g(x,y)=O(y2) and f, g are reversible with respect to the involution G: (x,y)(-x,y), that is, f(-x,y)=f(x,y), g(-x,y)=-g(x,y). We study the accumulation of an analytic invariant torus 0 of the reversible system with Diophantine frequency ω0 by other invariant tori. We will prove that if the Birkhoff normal form around 0 is 0-degenerate, then 0 is accumulated by other analytic invariant tori, the Lebesgue measure of the union of these tori being positive and the density of the union of these tori at 0 being one. We will also prove that if the Birkhoff normal form around 0 is j-degenerate (1≤ j≤ d-1) and condition (1.6) is satisfied, then through 0 there passes an analytic subvariety of dimension d+j foliated into analytic invariant tori with frequency vector ω0. If the Birkhoff normal form around 0 is d-1-degenerate, we will prove a stronger result, that is, a full neighborhood of 0 is foliated into analytic invariant tori with frequency vectors proportional to ω0.