Convergence and superconvergence analyses of HDG methods for time fractional diffusion problems

Abstract

We study the hybridizable discontinuous Galerkin (HDG) method for the spatial discretization of time fractional diffusion models with Caputo derivative of order 0<α<1. For each time t ∈ [0,T], the HDG approximations are taken to be piecewise polynomials of degree k0 on the spatial domain~Ω, the approximations to the exact solution u in the L∞(0,T;L2(Ω))-norm and to ∇ u in the L∞(0,T; L2(Ω))-norm are proven to converge with the rate hk+1 provided that u is sufficiently regular, where h is the maximum diameter of the elements of the mesh. Moreover, for k1, we obtain a superconvergence result which allows us to compute, in an elementwise manner, a new approximation for u converging with a rate hk+2 (ignoring the logarithmic factor), for quasi-uniform spatial meshes. Numerical experiments validating the theoretical results are displayed.