Towards optimal regularity for the fourth-order thin film equation in N: Graveleau-type focusing self-similarity

Abstract

An approach to some "optimal" (more precisely, non-improvable) regularity of solutions of the thin film equation ut = -∇ ·(|u|n ∇ u) in × +, u(x,0)=u0(x) in N, where n in (0,2) is a fixed exponent, with smooth compactly supported initial data u0(x), in dimensions N ≥ 2 is discussed. Namely, a precise exponent for the H\"older continuity with respect to the spatial radial variable |x| is obtained by construction of a Graveleau-type focusing self-similar solution. As a consequence, optimal regularity of the gradient ∇ u in certain Lp spaces, as well as a H\"older continuity property of solutions with respect to x and t, are derived, which cannot be obtained by classic standard methods of integral identities-inequalities. Several profiles for the solutions in the cases n=0 and n>0 are also plotted. In general, we claim that, even for arbitrarily small n>0 and positive analytic initial data u0(x), the solutions u(x,t) cannot be better than Cx2--smooth, where (n)=O(n) as n 0.