Jump-preserving polynomial interpolation in non-manifold polyhedra
Abstract
We construct a piecewise-polynomial interpolant u u for functions u: R, where ⊂ Rd is a Lipschitz polyhedron and ⊂ is a possibly non-manifold (d-1)-dimensional hypersurface. This interpolant enjoys approximation properties in relevant Sobolev norms, as well as a set of additional algebraic properties, namely, 2 = , and preserves homogeneous boundary values and jumps of its argument on . As an application, we obtain a bounded discrete right-inverse of the "jump" operator across , and an error estimate for a Galerkin scheme to solve a second-order elliptic PDE in with a prescribed jump across .
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