Data approximation by \(L^1\) spline fits with free knots
From MaRDI portal
Publication:2668215
DOI10.1016/j.cagd.2021.102064OpenAlexW4200129894MaRDI QIDQ2668215
Publication date: 3 March 2022
Published in: Computer Aided Geometric Design (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cagd.2021.102064
Related Items (1)
Cites Work
- Unnamed Item
- \(L_1C^1\) polynomial spline approximation algorithms for large data sets
- \(L_1\) spline methods for scattered data interpolation and approximation
- Shape-preserving univariate cubic and higher-degree \(L_{1}\) splines with function-value-based and multistep minimization principles
- Adaptive knot placement in B-spline curve approximation
- Least squares splines with free knots: Global optimization approach.
- Shape-preserving, multiscale fitting of univariate data by cubic \(L_1\) smoothing splines
- On shape-preserving capability of cubic \(L^1\) spline fits
- Learnt knot placement in B-spline curve approximation using support vector machines
- Univariate cubic \(L_1\) interpolating splines: analytical results for linearity, convexity and oscillation on 5-pointwindows
- Univariate cubic \(L_1\) interpolating splines: spline functional, window size and analysis-based algorithm
- Least squares approximation by splines with free knots
- Univariate cubic \(L_{p}\) splines and shape-preserving, multiscale interpolation by univariate cubic \(L_{1}\) splines
- Knot calculation for spline fitting based on the unimodality property
- Approximating term structure of interest rates using cubic \(L_1\) splines
- Shape-preserving approximation of multiscale univariate data by cubic \(L_1\) spline fits
- Shape-preserving, first-derivative-based parametric and nonparametric cubic \(L_{1}\) spline curves
- Nonlinear L 1 C 1 Interpolation: Application to Images
- Surface Reconstruction and Image Enhancement via $L^1$-Minimization
- A Data-Reduction Strategy for Splines with Applications to the Approximation of Functions and Data
- Approximation to Data by Splines with Free Knots
- Shape-preserving, multiscale interpolation by bi- and multivariate cubic \(L_{1}\) splines
This page was built for publication: Data approximation by \(L^1\) spline fits with free knots
