KAM theorem for reversible mapping of low smoothness with application
Abstract
Assume the mapping A:\ arrayll x1=x+ω+y+f(x,y), y1=y+g(x,y), array . (x, y)∈ Td× B(r0) is reversible with respect to G: (x, y) (-x, y), and | f | C(Td× B(r0))≤ 0, | g |C+d(Td× B(r0))≤ 0, where B(r0):=\|y| r0:\; y∈ Rd\, =2d+1+μ with 0<μ 1. Then when 0=0(d)>0 is small enough and ω is Diophantine, the map A possesses an invariantS torus with rotational frequency ω. As an application of the obtained theorem, the Lagrange stability is proved for a class of reversible Duffing equation with finite smooth perturbation.
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