The coexistence of quasi-periodic and blow-up solutions in a superlinear Duffing equation
Abstract
In this paper we will construct a continuous positive periodic function p(t) such that the corresponding superlinear Duffing equation x"+a(x)\,x2n+1+p(t)\,x2m+1=0,\ \ \ \ n+2≤ 2m+1<2n+1 possesses a solution which escapes to infinity in some finite time, and also has infinitely many subharmonic and quasi-periodic solutions, where the coefficient a(x) is an arbitrary positive smooth periodic function defined in the whole real axis.
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