Rutgers University AND (original) (raw)

A new look at compactly supported biorthogonal Riesz bases of wavelets

International Journal of Intelligent Systems Design and Computing, 2017

Construction of non separable dyadic compactly supported orthonormal wavelet bases for L2(R2) of arbitrarily high regularity

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Revista Matematica Iberoamericana, 1999

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Applied and Computational Harmonic Analysis, 2003

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Applied Mathematics and Computation, 2006

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Signal Processing, 1997

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Compactly supported wavelets and representations of the Cuntz relations, II

Palle Jorgensen

2000

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Two-dimensional orthogonal filter banks and wavelets with linear phase

Yehoshua Zeevi

IEEE Transactions on Signal Processing, 1998

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Necessary conditions on the lifting scheme for existence of wavelets in L2(R)

Gary McDarby

International Conference on Acoustics, Speech, and Signal Processing, 2000

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A Kotel'nikov Representation for Wavelets

h.m. de oliveira, R. C. Oliveira

ArXiv 1801.05859 [math.CA], 2018

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Construction of Wavelets and Applications

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Construction of multivariate compactly supported orthonormal wavelets

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Advances in Computational Mathematics, 2006

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Two-Dimensional Linear Phase Orthogonal Filter-Banks And Wavelets

Yehoshua Zeevi

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Bandlimited Refinable Functions for Wavelets and Framelets

Chen Weiqiang

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Stability of Biorthogonal Wavelet Bases in L 2(R)

Gary McDarby

Lecture Notes in Computer Science, 2001

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Construction of Bivariate Symmetric Orthonormal Wavelets With Short Support

Ming-jun Lai

1999

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Large classes of minimally supported frequency wavelets ofL 2(ℝ) andH 2(ℝ)

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Journal of Geometric Analysis, 2003

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Compactly Supported Wavelets and Representations of the Cuntz Relations

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Applied and Computational Harmonic Analysis, 2000

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More General Constructions of Wavelets on the Interval

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Journal of Mathematical Analysis and Applications, 2008

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Rutgers University AND (original) (raw)

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