Bernis estimates for higher-dimensional doubly-degenerate non-Newtonian thin-film equations
Abstract
For the doubly-degenerate parabolic non-Newtonian thin-film equation ut + div(un |∇ u|p-2 ∇ u) = 0, we derive (local versions) of Bernis estimates of the form ∫ un-2p |∇ u|3p\, dx + ∫ un-p2 | u|3p2\, dx ≤ c(n,p,d) ∫ un|∇ u|p\, dx, for functions u ∈ W2p() with Neumann boundary condition, where 2 ≤ p < 193 and n lies in a certain range. Here, ⊂ Rd is a smooth convex domain with d < 3p. A particularly important consequence is the estimate ∫ |∇ (un+pp)|p\, dx ≤ c(n,p,d) ∫ un|∇ u|p\, dx. The methods used in this article follow the approach of [Gr\"u01] for the Newtonian case, while addressing the specific challenges posed by the nonlinear higher-order term |∇ u|p-2 ∇ u and the additional degeneracy. The derived estimates are key to establishing further qualitative results, such as the existence of weak solutions, finite propagation of support, and the appearance of a waiting-time phenomenon.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.