Author:
Ivanovich Yaremenko Mykola
Abstract
We study the regularity properties of the solutions to the fractional Laplacian equation with perturbations. The Harnack inequality of a weak solution u∈WspRl to the fractional Laplacian problem is established, and the oscillation of the solution to the fractional Laplacian is estimated. We show that let 1≤p<∞ and s∈01, and let u∈Wsp be a weak solution to Lu=0inΩ, with the condition u=finRl\\Ω, where function f belongs to the Sobolev space WspRl. Then, the function u∈Wsp is locally Holder continuous and oscillation of the function satisfies the estimation oscBx0ru≤Cδspp−1upBx0ρp+ +Cδspp−1maxu0p−11⋅−x0l+spRl\\Bx0ρ1p−1 holds for δ∈01 and for all r,ρ such that 0<r<ρ. Also, let u∈WspRl be a weak solution to the boundary problem for the fractional Laplacian −Δps−b⋅∇u=0inΩ, and on the boundary u=finRl\\Ω, where 1≤p<∞ and s∈01, and let u be nonnegative in a ball function with the center x0 with the radius ρ, then the following estimation supBx0ru≤CinfBx0ru+Crρspp−1max−u0p−11⋅−x0l+spRl\\Bx0ρ1p−1 holds for r,ρ such that 0<r<ρ.