Level-dependent interpolatory Hermite subdivision schemes and wavelets
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Publication:2324625
DOI10.1007/S00365-018-9444-4OpenAlexW2963702512MaRDI QIDQ2324625
Caroline Moosmüller, Nada Sissouno, Thomas Sauer, Mariantonia Cotronei
Publication date: 11 September 2019
Published in: Constructive Approximation (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1801.03123
Numerical methods for wavelets (65T60) Algorithms for approximation of functions (65D15) Series expansions (e.g., Taylor, Lidstone series, but not Fourier series) (41A58)
Related Items (15)
A Hermite interpolatory subdivision scheme constructed from quadratic rational Bernstein-Bezier spline ⋮ Vector subdivision schemes and their convergence for arbitrary matrix masks ⋮ Multivariate generalized Hermite subdivision schemes ⋮ Optimized dual interpolating subdivision schemes ⋮ Hermite multiwavelets for manifold-valued data ⋮ Analysis and convergence of Hermite subdivision schemes ⋮ Shape preserving rational [3/2 Hermite interpolatory subdivision scheme] ⋮ Analysis of non-stationary Hermite subdivision schemes reproducing exponential polynomials ⋮ Factorization of Hermite subdivision operators from polynomial over-reproduction ⋮ Polynomial reproduction of Hermite subdivision schemes of any order ⋮ On the refinement matrix mask of interpolating Hermite splines ⋮ Unnamed Item ⋮ Annihilation operators for exponential spaces in subdivision ⋮ Convergence analysis of Hermite subdivision schemes of any arity ⋮ Shape preserving Hermite subdivision scheme constructed from quadratic polynomial
Cites Work
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- Approximation order and approximate sum rules in subdivision
- From Hermite to stationary subdivision schemes in one and several variables
- Dual Hermite subdivision schemes of de Rham-type
- Factorization of Hermite subdivision operators preserving exponentials and polynomials
- Algebraic conditions on non-stationary subdivision symbols for exponential polynomial reproduction
- Interpolatory wavelets for manifold-valued data
- Convergent vector and Hermite subdivision schemes
- Scalar and Hermite subdivision schemes
- Exponentials reproducing subdivision schemes
- Hermite subdivision on manifolds via parallel transport
- Analysis of asymptotically equivalent binary subdivision schemes
- Definability and stability of multiscale decompositions for manifold-valued data
- A note on Hermite multiwavelets with polynomial and exponential vanishing moments
- Regularity of generalized Daubechies wavelets reproducing exponential polynomials with real-valued parameters
- Hermite subdivision schemes and Taylor polynomials
- Convergence of level-dependent Hermite subdivision schemes
- Ellipse-preserving Hermite interpolation and subdivision
- $C^1$ Analysis of Hermite Subdivision Schemes on Manifolds
- Subdivision schemes in geometric modelling
- Generalized Daubechies Wavelet Families
- Noninterpolatory Hermite subdivision schemes
- Cardinal exponential splines: part I - theory and filtering algorithms
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