A basic homogenization problem for the p-Laplacian in Rd perforated along a sphere: L∞ estimates
Abstract
We consider a boundary value problem for the p-Laplacian, posed in the exterior of small cavities that all have the same p-capacity and are anchored to the unit sphere in Rd, where 1<p<d. We assume that the distance between anchoring points is at least and the characteristic diameter of cavities is α , where α=α() tends to 0 with . We also assume that anchoring points are asymptotically uniformly distributed as 0, and their number is asymptotic to a positive constant times 1-d. The solution u=u is required to be 1 on all cavities and decay to 0 at infinity. Our goal is to describe the behavior of solutions for small >0. We show that the problem possesses a critical window characterized by τ:= 0α /αc ∈ (0,∞), where αc=1/γ and γ= d-pp-1. We prove that outside the unit sphere, as 0, the solution converges to A*U for some constant A*, where U(x)=\1,|x|-γ\ is the radial p-harmonic function outside the unit ball. Here the constant A* equals 0 if τ=0, while A*=1 if τ=∞. In the critical window where τ is positive and finite, A*∈(0,1) is explicitly computed in terms of the parameters of the problem. We also evaluate the limiting p-capacity in all three cases mentioned above. Our key new tool is the construction of an explicit ansatz function uA* that approximates the solution u in L∞(Rd) and satisfies \|∇ u-∇ uA* \|Lp(Rd) 0 as 0.
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.