A new example on Lyapunov stability

Abstract

The purpose of this paper is to present an example of an Ordinary Differential Equation x'=F(x) in the infinite-dimensional Hilbert space 2 with F being of class C1 in the Fr\'echet sense, such that the origin is an asymptotically stable equilibrium point but the spectrum of the linearized operator DF(0) intersects the half-plane (z)>0. The possible existence or not of an example of this kind has been an open question until now, to our knowledge. An analogous example, but of a non-invertible map instead of a flow defined by an ODE was recently constructed by the authors in a recent paper. The two examples use different techniques, but both are based on a classical example in Operator Theory due to S. Kakutani.