Exponential Convergence of hp FEM for the Integral Fractional Laplacian in Polygons
Abstract
We prove exponential convergence in the energy norm of hp finite element discretizations for the integral fractional diffusion operator of order 2s∈ (0,2) subject to homogeneous Dirichlet boundary conditions in bounded polygonal domains ⊂ R2. Key ingredient in the analysis are the weighted analytic regularity from our previous work and meshes that feature anisotropic geometric refinement towards ∂.
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