q-Gaussians in the porous-medium equation: stability and time evolution

Abstract

The stability of q-Gaussian distributions as particular solutions of the linear diffusion equation and its generalized nonlinear form, P(x,t)t = D 2 [P(x,t)]2-qx2, the porous-medium equation, is investigated through both numerical and analytical approaches. It is shown that an initial q-Gaussian, characterized by an index qi, approaches the final, asymptotic solution, characterized by an index q, in such a way that the relaxation rule for the kurtosis evolves in time according to a q-exponential, with a relaxation index q rel q rel(q). In some cases, particularly when one attempts to transform an infinite-variance distribution (qi 5/3) into a finite-variance one (q<5/3), the relaxation towards the asymptotic solution may occur very slowly in time. This fact might shed some light on the slow relaxation, for some long-range-interacting many-body Hamiltonian systems, from long-standing quasi-stationary states to the ultimate thermal equilibrium state.