Universal Power Law Scaling Near the Turning Points

Abstract

We show analytically and numerically that, the velocity v of a particle near the turning points x0 vanishes, i. e. v→ 0 as x→ x0, according to the power law scaling |v| |x0-x|β, where the exponent β=1/2 is independent of the particle mass and the force acting on it. We also show that, the time spends it any particle at each small interval dx near the turning points diverges as τ |x0-x|, with the exponent =-1/2. Behavior we find here is very similar to power law scaling that had been found near the critical points for systems which undergo a phase transition.