Interpolating \(m\)-refinable functions with compact support: the second generation class
From MaRDI portal
Publication:2279644
DOI10.1016/J.AMC.2019.06.018zbMath1428.41004OpenAlexW2954578867WikidataQ127623726 ScholiaQ127623726MaRDI QIDQ2279644
Publication date: 13 December 2019
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2019.06.018
Related Items (6)
Optimized dual interpolating subdivision schemes ⋮ Creating a bridge between cardinal B\(r\)-spline fundamental functions for interpolation and subdivision ⋮ Recursive process for constructing the refinement rules of new combined subdivision schemes and its extended form ⋮ Dual univariate interpolatory subdivision of every arity: algebraic characterization and construction ⋮ Interpolatory filter banks and interpolatory wavelet packets ⋮ Bezout-like polynomial equations associated with dual univariate interpolating subdivision schemes
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Complete characterization of the regions of \(C^2\) and \(C^3\) convergence of combined ternary 4-point subdivision schemes
- Shape controlled interpolatory ternary subdivision
- A study on the mask of interpolatory symmetric subdivision schemes
- A unified framework for interpolating and approximating univariate subdivision
- Estimating error bounds for quaternary subdivision schemes
- Symmetric iterative interpolation processes
- Sets of matrices all infinite products of which converge
- Convergence of vector subdivision schemes in Sobolev spaces
- Multiple multivariate subdivision schemes: matrix and operator approaches
- A combined approximating and interpolating ternary 4-point subdivision scheme
- Interpolatory subdivision schemes with the optimal approximation order
- Dual univariate \(m\)-ary subdivision schemes of de Rham-type
- Symbols and exact regularity of symmetric pseudo-splines of any arity
- Polynomial reproduction for univariate subdivision schemes of any arity
- Finiteness conjecture and subdivision
- Stationary binary subdivision schemes using radial basis function interpolation
- A butterfly subdivision scheme for surface interpolation with tension control
- Subdivision schemes in geometric modelling
- Simple Regularity Criteria for Subdivision Schemes
- Dubuc--Deslauriers Subdivision for Finite Sequences and Interpolation Wavelets on an Interval
- Spectral factorization of 2-block Toeplitz matrices and refinement equations
This page was built for publication: Interpolating \(m\)-refinable functions with compact support: the second generation class
