Affiliation:
1. School of Mathematical Sciences, Hebei Normal University, Shijiazhuang 050024, China
2. Hebei Key Laboratory of Computational Mathematics and Applications, Shijiazhuang 050024, China
Abstract
The Be´zier-type operator has become a powerful tool in operator theory, neural networks, curve and surface design and representation because of its good shape-preserving properties. Motivated by the improvements of the operator in computational disciplines, we investigate some elementary properties of two kinds of modified Sza´sz type basis functions, depending on non-negative parameters. Using the derivative, the symmetry of variables, the modulus of continuity and the concave continuous modulus, we study some shape preserving properties of these operators concerning monotonicity, convexity, starshapedness, semi-additivity and the preservation of smoothness. Moreover, some illustrative examples are provided to demonstrate the approximation behavior of the proposed operators and the classical ones.
Funder
Science and Technology Project of Hebei Education Department
Science Foundation of Hebei Normal University
Subject
Physics and Astronomy (miscellaneous),General Mathematics,Chemistry (miscellaneous),Computer Science (miscellaneous)
Reference28 articles.
1. Farin, G. (2002). Curves and Surfaces for Computer-Aided Geometric Design, Elsevier Inc.. [5th ed.].
2. Marsh, D. (2005). Applied Geometry for Computer Graphics and CAD, Springer.
3. Ye, Z., Long, X., and Zeng, X.M. (2010). Adjustment Algorithms for Bézier Curve and Surface, IEEE.
4. Generalized Bernstein-Bézier polynomial;Chang;J. Comput. Math.,1983
5. Mathematical foundations of Bézier technique;Chang;Comput.-Aided Des.,1981
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