Frontiers of Mathematics in China >
Dynamical behaviors for generalized pendulum type equations with p-Laplacian
Received date: 05 Dec 2019
Accepted date: 26 Aug 2020
Published date: 15 Oct 2020
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We consider a pendulum type equation with p-Laplacian , where and p(t) are 1-periodic about every variable. The solutions of this equation present two interesting behaviors. On the one hand, by applying Moser's twist theorem, we find infinitely many invariant tori whenever which yields the bounded-ness of all solutions and the existence of quasi-periodic solutions starting at t = 0 on the invariant tori. On the other hand, if p(t) = 0 and has some specific forms, we find a full symbolic dynamical system made by solutions which oscillate between any two different trivial solutions of the equation. Such chaotic solutions stay close to the trivial solutions in some fixed intervals, according to any prescribed coin-tossing sequence.
Key words: p-Laplacian; invariant tori; quasi-periodic solutions; boundedness; complex dynamics
Yanmin NIU , Xiong LI . Dynamical behaviors for generalized pendulum type equations with p-Laplacian[J]. Frontiers of Mathematics in China, 2020 , 15(5) : 959 -984 . DOI: 10.1007/s11464-020-0858-5
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