In this paper we construct and analyse cubic and quartic quasi-interpolating splines on type-1 triangulations approximating regularly distributed data, without using minimal determining sets and without defining the approximating splines as linear combinations of compactly supported bivariate spanning functions. In particular, the cubic splines are directly determined by setting their Bernstein–Bézier coefficients to appropriate combinations of the given data values without using prescribed derivatives at any point of the domain, in such a way that the -smoothness conditions are satisfied and approximation order three is guaranteed, for smooth functions. We also propose some numerical tests that confirm the theoretical results. Then, from the above cubic splines we obtain quartic splines exact on , achieving approximation order four. The associated differential quasi-interpolation operator involves the values of the first partial derivatives in its definition.

Point and differential C1quasi-interpolation on three direction meshes

Dagnino, C.;Remogna, S.
2019-01-01

Abstract

In this paper we construct and analyse cubic and quartic quasi-interpolating splines on type-1 triangulations approximating regularly distributed data, without using minimal determining sets and without defining the approximating splines as linear combinations of compactly supported bivariate spanning functions. In particular, the cubic splines are directly determined by setting their Bernstein–Bézier coefficients to appropriate combinations of the given data values without using prescribed derivatives at any point of the domain, in such a way that the -smoothness conditions are satisfied and approximation order three is guaranteed, for smooth functions. We also propose some numerical tests that confirm the theoretical results. Then, from the above cubic splines we obtain quartic splines exact on , achieving approximation order four. The associated differential quasi-interpolation operator involves the values of the first partial derivatives in its definition.
2019
354
373
389
Bernstein–Bézier form; Quasi-interpolation; Spline approximation; Type-1 triangulation;
Barrera, D.*; Dagnino, C.; Ibáñez, M.J.; Remogna, S.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/1680736
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