I'm wondering, if we have a nonlinear system governed by
$\dot{x} = Ax + g(x)$ where $||g(x)|| \leq \gamma ||x||^2$ and A is Hurwitz
how can we show that the origin is globally exponentially stable? My first thoughts are to use Lyapunov's Indirect Method but what Lyapunov candidate function would work here?
Is $V(x) = x^{T}Px + \int_0^x g(y)dy$ suitable?
Or how else can we show that the origin is globally exponentially stable?
Thanks in advance
