Abstract

We analyze the limit behavior as $s\to 1^-$ of the solution to the fractional Poisson equation $(-Δ)^s u_s=f_s$, $x\inΩ$ with homogeneous Dirichlet boundary conditions $u_s\equiv 0$, $x\inΩ^c$. We show that $\lim_{s\to 1^-} u_s =u$, with $-Δu =f$, $x\inΩ$ and $u=0$, $x\in\partialΩ$. Our results are complemented by a discussion on the rate of convergence and on extensions to the parabolic setting.