On the constants in inverse trace inequalities for polynomials orthogonal to lower-order subspaces
Abstract
We derive sharp, explicit constants in inverse trace inequalities for polynomial functions belonging to Pp(T) (polynomial space with total degree p) that are orthogonal to the lower-order subspace Pn(T), n≤ p, where T denotes a d-dimensional simplex. The proofs rely on orthogonal polynomial expansions on reference simplices and on a careful analysis of the eigenvalues of the relevant blocks of the face mass matrices, following the arguments developed in [9]. These results are very useful in the hp-analysis of the hybrid Galerkin methods, e.g. hybridizable discontinuous Galerkin methods, hybrid high-order methods, etc.
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