New results on approximate Hilbert pairs of wavelet filters with common factors

Sophie Achard; Marianne Clausel; Irène Gannaz; François Roueff

doi:10.1016/j.acha.2019.06.001

Article Dans Une Revue Applied and Computational Harmonic Analysis Année : 2020

New results on approximate Hilbert pairs of wavelet filters with common factors

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Sophie Achard

Fonction : Auteur
PersonId : 173323
IdHAL : sophie-achard
ORCID : 0000-0001-9448-1199
IdRef : 078145414

GIPSA - Vision and Brain Signal Processing

Marianne Clausel

Fonction : Auteur
PersonId : 1085215
ORCID : 0000-0002-5329-0801
IdRef : 133853195

Institut Élie Cartan de Lorraine

Irène Gannaz

Fonction : Auteur
PersonId : 13849
IdHAL : gannaz
ORCID : 0000-0003-1456-4985
IdRef : 125124732

Probabilités, statistique, physique mathématique

François Roueff

Fonction : Auteur
PersonId : 173722
IdHAL : francois-roueff
ORCID : 0000-0003-2372-0724
IdRef : 05778728X

Signal, Statistique et Apprentissage

Département Images, Données, Signal

Résumé

In this paper, we consider the design of wavelet filters based on the Thiran common-factor approach proposed in Selesnick [2001]. This approach aims at building finite impulse response filters of a Hilbert-pair of wavelets serving as real and imaginary part of a complex wavelet. Unfortunately it is not possible to construct wavelets which are both finitely supported and analytic. The wavelet filters constructed using the common-factor approach are then approximately analytic. Thus, it is of interest to control their analyticity. The purpose of this paper is to first provide precise and explicit expressions as well as easily exploitable bounds for quantifying the analytic approximation of this complex wavelet. Then, we prove the existence of such filters enjoying the classical perfect reconstruction conditions, with arbitrarily many vanishing moments.

Mots clés

orthonormal filter banks Complex wavelet Hilbert-pair common-factor wavelets

Domaines

Méthodologie [stat.ME] Applications [stat.AP]

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common_factor_article_hal.pdf (555.87 Ko)

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https://hal.univ-grenoble-alpes.fr/hal-01613583

Soumis le : mardi 23 juillet 2019-00:38:55

Dernière modification le : mercredi 23 octobre 2024-10:30:04

Dates et versions

hal-01613583 , version 1 (25-10-2017)

hal-01613583 , version 2 (23-07-2019)

Identifiants

HAL Id : hal-01613583 , version 2
ARXIV : 1710.09095
DOI : 10.1016/j.acha.2019.06.001

Citer

Sophie Achard, Marianne Clausel, Irène Gannaz, François Roueff. New results on approximate Hilbert pairs of wavelet filters with common factors. Applied and Computational Harmonic Analysis, 2020, 49 (3), pp.1025-1045. ⟨10.1016/j.acha.2019.06.001⟩. ⟨hal-01613583v2⟩

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New results on approximate Hilbert pairs of wavelet filters with common factors

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