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On the s-derivative of weak solutions of the Poisson problem for the regional fractional Laplacian
Published 17 Dec 2021 in math.AP | (2112.09547v4)
Abstract: In this paper, we analyze the $s$-dependence of the solution $u_s$ to the fractional Poisson equation $(-\Delta)s_{\Omega} = f$ in an open bounded set $\Omega \subset \mathbb{R}N$. Precisely, we show that the solution map $(0,1)\to L2(\Omega)$, $s\mapsto u_s$ is continuously differentiable. Moreover, when $f = \lambda_s u_s$, we also analyze the one-sided differentiability of the first nontrivial eigenvalue of $(-\Delta)s_{\Omega}$ regarded as a function of $s \in (0,1)$.
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