Measure valued solutions of sub-linear diffusion equations with a drift term

Abstract

In this paper we study nonnegative, measure valued solutions of the initial value problem for one-dimensional drift-diffusion equations when the nonlinear diffusion is governed by an increasing C1 function β with r +∞ β(r)<+∞. By using tools of optimal transport, we will show that this kind of problems is well posed in the class of nonnegative Borel measures with finite mass m and finite quadratic momentum and it is the gradient flow of a suitable entropy functional with respect to the so called L2-Wasserstein distance. Due to the degeneracy of diffusion for large densities, concentration of masses can occur, whose support is transported by the drift. We shall show that the large-time behavior of solutions depends on a critical mass m c, which can be explicitely characterized in terms of β and of the drift term. If the initial mass is less then m c, the entropy has a unique minimizer which is absolutely continuous with respect to the Lebesgue measure. Conversely, when the total mass m of the solutions is greater than the critical one, the steady state has a singular part in which the exceeding mass m - m c is accumulated.