Invariant tori and boundedness of solutions of non-smooth oscillators with Lebesgue integrable forcing term

Abstract

Since Littlewood works in the 1960's, the boundedness of solutions of Duffing-type equations x+g(x)=p(t) has been extensively investigated. More recently, some researches have focused on the family of non-smooth forced oscillators x+sgn(x)=p(t), mainly because it represents a simple limit scenario of Duffing-type equations for when g is bounded. Here, we provide a simple proof for the boundedness of solutions of the non-smooth forced oscillator in the case that the forcing term p(t) is a T-periodic Lebesgue integrable function with vanishing average. We reach this result by constructing a sequence of invariant tori whose union of their interiors covers all the (t,x, x)-space, (t,x,x)∈ S1×R2.