Asymptotic solutions of a nonlinear diffusive equation in the framework of $κ$-generalized statistical mechanics
arXiv:0902.4775 · doi:10.1140/epjb/e2009-00159-6
Abstract
The asymptotic behavior of a nonlinear diffusive equation obtained in the framework of the $κ$-generalized statistical mechanics is studied. The analysis based on the classical Lie symmetry shows that the $κ$-Gaussian function is not a scale invariant solution of the generalized diffusive equation. Notwithstanding, several numerical simulations, with different initial conditions, show that the solutions asymptotically approach to the $κ$-Gaussian function. Simple argument based on a time-dependent transformation performed on the related $κ$-generalized Fokker-Planck equation, supports this conclusion.
Submitted to EPJB