Hybridizable Staggered Discontinuous Galerkin Methods for Polyharmonic Equations on Polytopes

Abstract

Hybridizable staggered discontinuous Galerkin methods are developed for arbitrary-order polyharmonic equations (-Δ)m u=f on shape-regular polytopal meshes in Rd, for any m1, d2, and polynomial degree k0. The method uses the mixed variable σ=∇m u and a staggered primal--dual mesh to impose complementary continuity on scalar and tensor unknowns, without restrictions such as d m. Local trace and bubble enrichments stabilize low-order tensor spaces without adding global unknowns. Hybridization localizes the tensor variable and yields an equivalent stabilization-free weak Galerkin formulation. Well-posedness and optimal energy error estimates are proved, and numerical experiments on polygonal and tetrahedral meshes confirm the predicted rates.

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