WSEAS Transactions on Mathematics


Print ISSN: 1109-2769
E-ISSN: 2224-2880

Volume 18, 2019

Notice: As of 2014 and for the forthcoming years, the publication frequency/periodicity of WSEAS Journals is adapted to the 'continuously updated' model. What this means is that instead of being separated into issues, new papers will be added on a continuous basis, allowing a more regular flow and shorter publication times. The papers will appear in reverse order, therefore the most recent one will be on top.

Volume 18, 2019


On Splines’ Smoothness

AUTHORS: Yu. K. Dem’yanovich, I. D. Miroshnichenko, E. F. Musafarova

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The aim of this article is to discuss the generalized smoothness for the splines on q-covered manifold, where q is the natural number. By using mentioned smoothness it is possible to consider the different types of smoothness, for example, the integral smoothness, the weight smoothness, the derivatives smoothness, etc. We find the necessary and sufficient conditions for calculation of basic splines with a’priori prescribed smoothness. The mentioned smoothness may contain no more than q (locally formulated) linearly independentconditions. If the number of the conditions is exactly q, then the discussed spline spaces on the embedded grids are also embedded.

KEYWORDS: approximation relations, embedded spaces, generalized smoothness, wavelet expansions

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WSEAS Transactions on Mathematics, ISSN / E-ISSN: 1109-2769 / 2224-2880, Volume 18, 2019, Art. #18, pp. 129-136


Copyright Β© 2018 Author(s) retain the copyright of this article. This article is published under the terms of the Creative Commons Attribution License 4.0

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