Open Mathematics (Aug 2021)
Construction of a family of non-stationary combined ternary subdivision schemes reproducing exponential polynomials
Abstract
In this paper, we propose a family of non-stationary combined ternary (2m+3)\left(2m+3)-point subdivision schemes, which possesses the property of generating/reproducing high-order exponential polynomials. This scheme is obtained by adding variable parameters on the generalized ternary subdivision scheme of order 4. For such a scheme, we investigate its support and exponential polynomial generation/reproduction and get that it can generate/reproduce certain exponential polynomials with suitable choices of the parameters and reach 2m+32m+3 approximation order. Moreover, we discuss its smoothness and show that it can produce C2m+2{C}^{2m+2} limit curves. Several numerical examples are given to show the performance of the schemes.
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