Directional Stockwell transform in L 2(ℝ n )

Waseem Z. Lone; Firdous A. Shah; Hatem Mejjaoli

doi:10.1080/10652469.2022.2055554

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Directional Stockwell transform in L 2(ℝ n )

Journal article

Peer reviewed

Directional Stockwell transform in L 2(ℝ n )

Waseem Z. Lone, Firdous A. Shah and Hatem Mejjaoli

Integral transforms and special functions, Vol.33(11), pp.867-888

02/11/2022

DOI: https://doi.org/10.1080/10652469.2022.2055554

Abstract

directional short-time Fourier transform

Donoho-Starck inequality

Nazorov' inequality

Pitt's inequality

Primary: 65R10

Secondary: 42B10

Stockwell transform

wavelet transform

Window function

In the present article, we propose a directionally tuned variant of the continuous Stockwell transform in the context of multi-dimensional signal analysis. Owing to the directional selectivity coupled with a frequency adaptable window, the proposed transform serves as a bridge between the directional short-time Fourier and wavelet transforms. Besides the formulation of all the fundamental results, including the orthogonality relation and reconstruction formula, we also obtain several uncertainty inequalities associated with the directional Stockwell transform.

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Title: Directional Stockwell transform in L 2(ℝ n )
Creators - without role: Waseem Z. Lone - University of Kashmir
Firdous A. Shah - University of Kashmir
Hatem Mejjaoli - Taibah University
Publication Details: Integral transforms and special functions, Vol.33(11), pp.867-888
Publisher: Taylor & Francis
Identifiers: 9929676808331
Academic Unit: Taibah University
Language: English
Resource Type: Journal article