A sharp stability criterion for single well Duffing and Duffing-like equations

Abstract

We refine some previous sufficient conditions for exponential stability of the linear ODE u''+ cu' + (b+a(t))u = 0 where b, c>0 and a is a bounded nonnegative time dependent coefficient. This allows to improve some results on uniqueness and asymptotic stability of periodic or almost periodic solutions of the equation u''+ cu' + g(u)=f(t) where c>0, f ∈ L∞ (R) and g∈ C1(R) satisfies some sign hypotheses. The typical case is g(u) = bu + a up u with a 0 , b>0. Similar properties are valid for evolution equations of the form u''+ cu' + (B+A(t))u = 0 where A(t) and B are self-adjoint operators on a real Hilbert space H with B coercive and A(t) bounded in L(H) with a sufficiently small bound of its norm in L∞(R+, L(H)) .