Multiresolution analyses based on fractal functions
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Publication:1198948
DOI10.1016/0021-9045(92)90134-AzbMath0772.41002OpenAlexW1963684587MaRDI QIDQ1198948
Douglas P. Hardin, Bruce Kessler, Peter R. Massopust
Publication date: 16 January 1993
Published in: Journal of Approximation Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0021-9045(92)90134-a
Related Items (20)
SOME RESULTS OF CONVERGENCE OF CUBIC SPLINE FRACTAL INTERPOLATION FUNCTIONS ⋮ Wavelets generated by vector multiresolution analysis ⋮ In reference to a self-referential approach towards smooth multivariate approximation ⋮ Minimally supported frequency composite dilation wavelets ⋮ Triangular wavelet based finite elements via multivalued scaling equations ⋮ Stability and independence of the shifts of finitely many refinable functions ⋮ Construction of biorthogonal wavelet vectors ⋮ Alpert Multiwavelets and Legendre--Angelesco Multiple Orthogonal Polynomials ⋮ Fractal interpolation functions and data compression for tracking ⋮ Wavelet Analysis of Self Similar Functions ⋮ Reproducing kernel Hilbert spaces and fractal interpolation ⋮ Generalization of Hermite functions by fractal interpolation ⋮ A general construction of fractal interpolation functions on grids of n ⋮ Minimally supported frequency composite dilation Parseval frame wavelets ⋮ SOME RESULTS OF CONVERGENCE OF CUBIC SPLINE FRACTAL INTERPOLATION FUNCTIONS ⋮ Vector-stability of refinable vectors ⋮ On Alpert multiwavelets ⋮ A construction of orthogonal compactly supported multiwavelets on \(\mathbf R^2\) ⋮ Biorthogonal multiwavelets on \([-1,1\)] ⋮ A construction of compactly supported biorthogonal scaling vectors and multiwavelets on \({\mathbf R}^{2}\)
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