Analysis of a new nonlinear interpolatory subdivision scheme on σ quasi-uniform grids
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This research was funded by the Fundación Séneca, Agencia de Ciencia y Technología de la Región de Murcia grant number 20928/PI/18 and by the Spanish national research project PID2019-108336GB-I00.Fecha de publicación
2021Editorial
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Ortiz, P.; Trillo, J.C. Analysis of a New Nonlinear Interpolatory Subdivision Scheme on σ Quasi-Uniform Grids. Mathematics 2021, 9, 1320. https://doi.org/10.3390/math9121320Palabras clave
InterpolationSubdivision schemes
Nonlinearity
Nonuniform
σ quasi-uniform
Resumen
In this paper, we introduce and analyze the behavior of a nonlinear subdivision operator called PPH, which comes from its associated PPH nonlinear reconstruction operator on nonuniform grids. The acronym PPH stands for Piecewise Polynomial Harmonic, since the reconstruction is built by using piecewise polynomials defined by means of an adaption based on the use of the weighted Harmonic mean. The novelty of this work lies in the generalization of the already existing PPH subdivision scheme to the nonuniform case. We define the corresponding subdivision scheme and study some important issues related to subdivision schemes such as convergence, smoothness of the limit function, and preservation of convexity. In order to obtain general results, we consider s quasi-uniform grids. We also perform some numerical experiments to reinforce the theoretical results.
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