Scaling limit of a kinetic inhomogeneous stochastic system in the quadratic potential

Abstract

We consider a particle evolving in the quadratic potential and subject to a time-inhomogeneous frictional force and to a random force. The couple of its velocity and position is solution to a stochastic differential equation driven by an α-stable L\'evy process with α ∈ (1,2] and the frictional force is of the form t-βsgn(v)|v|γ. We identify three regimes for the behavior in long-time of the couple velocity-position with a suitable rescaling, depending on the balance between the frictional force and the index of stability α of the noise.