Large harmonic functions for fully nonlinear fractional operators

Abstract

We study existence, uniqueness and boundary blow-up profile for fractional harmonic functions on a bounded smooth domain ⊂ RN. We deal with harmonic functions associated to uniformly elliptic, fully nonlinear nonlocal operators, including the linear case (-)s u = 0 in \ , where (-)s denotes the fractional Laplacian of order 2s ∈ (0,2). We use the viscosity solution's theory and Perron's method to construct harmonic functions with zero exterior condition in c, and boundary blow-up profile x x0, x ∈ dist(x, ∂ )1-su(x)=h(x0), for all x0∈ ∂ , for any given boundary data h ∈ C(∂ ). Our method allows us to provide blow-up rate for the solution and its gradient estimates. Results are new even in the linear case.