KAM theorem with large twist and finite smooth large perturbation

Abstract

In the present paper, we will discuss the following non-degenerate Hamiltonian system equation* H(θ,t,I)=H0(I)a+P(θ,t,I)b, equation* where (θ,t,I)∈Td+1×[1,2]d (T:=R/2π Z), a,b are given positive constants with a>b, H0: [1,2]d→ R is real analytic and P: Td+1× [1,2]d→ R is C with =2(d+1)(5a-b+2ad)a-b+μ, 0<μ1. We prove that if is sufficiently small, there is an invariant torus with given Diophantine frequency vector for the above Hamiltonian system. As for application, we prove that a finite network of Duffing oscillators with periodic exterior forces possesses Lagrangian stability for almost all initial data.

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