Bivariate B-splines from convex configurations
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摘要
An order-k univariate spline is a function defined over a set S of at least k+2 real parameters, called knots. Such a spline can be obtained as a linear combination of B-splines, each of them being defined over a subset of k+2 consecutive knots of S, called a configuration of S. In the bivariate setting, knots are pairs of reals and B-splines are defined over configurations of k+3 knots. Using convex pseudo-circles, we define a family of configurations that gives rise to bivariate B-splines that retain the fundamental properties of univariate B-splines. We also give an algorithm to construct such configurations.
论文关键词:B-spline,Simplex spline,Convex pseudo-circles
论文评审过程:Received 6 January 2020, Revised 28 September 2020, Accepted 18 March 2021, Available online 23 March 2021, Version of Record 26 March 2021.
论文官网地址:https://doi.org/10.1016/j.jcss.2021.03.002