【 摘 要 】

The results in this paper quantify the ability of cubic L-1 splines to preserve the shape of nonparametric data. The data under consideration include multiscale data, that is, data with abrupt changes in spacing and magnitude. A simplified dual-to-primal transformation for a geometric programming model for cubic L-1 splines is developed. This transformation allows one to establish in a transparent manner relationships between the shape-preserving properties of a cubic L-1 spline and the solution of the dual geometric-programming problem. Properties that have often been associated with shape preservation in the past include preservation of linearity and convexity/concavity. Under various circumstances, cubic L-1 splines preserve linearity and convexity/concavity of data. When four consecutive data points lie on a straight line, the cubic L-1 spline is linear in the interval between the second and third data points. Cubic L-1 splines of convex/concave data preserve convexity/concavity if the first divided differences of the data do not increase/decrease too rapidly. When cubic L-1 splines do not preserve convexity/concavity, they still do not cross the piecewise linear interpolant and, therefore, they do not have extraneous oscillation. (C) 2004 Elsevier B.V. All rights reserved.

【 授权许可】

Free   

【 预 览 】

附件列表

Files	Size	Format	View
10_1016_j_cam_2004_05_003.pdf	320KB	PDF	download