Solving a collection of free coexistence-like problems in stability (Q1824754)

The aim of the paper is to find all the \(C^ 1\) real maps f, defined in a neighbourhood of \(0\in {\mathbb{R}}\), such that the origin is Lyapunov stable for the system \[ \frac{d^ 2}{dt^ 2}x=g(x),\quad \frac{d^ 2}{dt^ 2}y=y(g'(x)+\frac{3\alpha g(x)}{1+\alpha x}),\quad x,y\in {\mathbb{R}}, \] where \(g(x)=-xf(x)\) and \(\alpha\in {\mathbb{R}}\).