Compactly supported fundamental functions for spline interpolation
From MaRDI portal
Publication:1104033
DOI10.1007/BF01395816zbMath0646.65012OpenAlexW2017297623MaRDI QIDQ1104033
Wolfgang Dahmen, Tim N. T. Goodman, Charles A. Micchelli
Publication date: 1988
Published in: Numerische Mathematik (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/133258
Related Items
A nodal spline interpolant for the Gregory rule of even order, Convergence of derivatives of optimal nodal splines, Nodal splines on compact intervals, A constructive approach to nodal splines, A general framework for the construction of piecewise-polynomial local interpolants of minimum degree, Optimal local refinable interpolants, Applications of optimally local interpolation to interpolatory approximants and compactly supported wavelets, A general spline differential quadrature method based on quasi-interpolation, Many-knot spline technique for approximation of data, Non-uniform interpolatory curve subdivision with edge parameters built upon compactly supported fundamental splines, Smoothness and error bounds of Martensen splines, Computation of Hermite interpolation in terms of B-spline basis using polar forms, Histopolating splines, Local cardinal interpolation by \(C^2\) cubic B2-splines with a tunable shape parameter, Geometric Hermite interpolation with maximal order and smoothness, Creating a bridge between cardinal B\(r\)-spline fundamental functions for interpolation and subdivision, Banded matrices with banded inverses, Quasi-nodal splines, Discretely blended Martensen interpolation, Polynomial-based non-uniform interpolatory subdivision with features control, Martensen splines, Local interpolation with optimal polynomial exactness in refinement spaces, The smooth piecewise polynomial particle shape functions corresponding to patch-wise non-uniformly spaced particles for meshfree particle methods, A general framework for local interpolation, Spline interpolation and wavelet construction, The closed form reproducing polynomial particle shape functions for meshfree particle methods, A new approach to deal with \(C^2\) cubic splines and its application to super-convergent quasi-interpolation, On \(C^2\) cubic quasi-interpolating splines and their computation by subdivision via blossoming, A Novel Recursive Modification Framework for Enhancing Polynomial Reproduction Property of Interpolation Basis Functions, Peano kernel error analysis for quadratic nodal spline interpolation, A homogeneity test based on empirical characteristic functions
Cites Work
