ArticleOpen Access

COUPLED FRACTIONAL WIGNER DISTRIBUTION WITH APPLICATIONS TO LFM SIGNALS

AAJAZ A. TEALI

Department of Mathematics, University of Kashmir, South Campus, Anantnag 192101, Jammu and Kashmir, India

E-mail Address: aajaz.math@gmail.com

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FIRDOUS A. SHAH

Department of Mathematics, University of Kashmir, South Campus, Anantnag 192101, Jammu and Kashmir, India

E-mail Address: fashah@uok.edu.in

Corresponding author.

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AZHAR Y. TANTARY

Department of Mathematics, University of Kashmir, South Campus, Anantnag 192101, Jammu and Kashmir, India

E-mail Address: aytku92@gmail.com

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, and

KOTTAKKARAN S. NISAR

Department of Mathematics, College of Arts and Sciences, Prince Sattam bin Abdulaziz University, Wadi Aldawasir 11991, Saudi Arabia

School of Technology, Woxsen University, Hyderabad 502345, Telangana, India

E-mail Address: n.sooppy@psau.edu.sa

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https://doi.org/10.1142/S0218348X23400200Cited by:3 (Source: Crossref)

This article is part of the issue:

Special Issue on Applications of Wavelets and Fractals in Engineering Sciences
Guest Editors: K. S. Nisar, F. A. Shah, S. K. Upadhyay and P. E. T. Jorgensen

Abstract

The coupled fractional Fourier transform is a much recent ramification of the two-dimensional fractional Fourier transform, wherein the kernel is not a tensor product of one-dimensional copies, but relies on two angles that are coupled to yield a new pair of transform parameters. In this paper, we introduce a novel two-dimensional Wigner distribution, coined as coupled fractional Wigner distribution (CFrWD). The prime advantage of such a ramification of the Wigner distribution lies in the fact that the CFrWD can efficiently tackle the higher-order-phase and chirp signals, which constitute a wider class of signals arising in modern communication systems. To begin with, we study some fundamental properties of the proposed CFrWD, including marginal, shifting, conjugate-symmetry and anti-derivative properties. In addition, we also formulate the Moyal’s principle, inversion formula and the convolution and correlation theorems associated with CFrWD. Nevertheless, we demonstrate the efficacy of CFrWD for estimating and detecting both the one-component and multi-component linear-frequency-modulated signals.

Keywords:

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Vol. 31, No. 02

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History

Received 17 March 2022

Accepted 5 June 2022

Published: February 18, 2023

Information

This is an Open Access article in the “Special Issue on Applications of Wavelets and Fractals in Engineering Sciences”, edited by K. S. Nisar (Prince Sattam bin Abdulaziz University, Saudi Arabia), F. A. Shah (University of Kashmir, India), S. K. Upadhyay (Indian Institute of Technology, BHU, India), P. E. T. Jorgensen (University of Iowa, USA) published by World Scientific Publishing Company. It is distributed under the terms of the Creative Commons Attribution 4.0 (CC BY) License which permits use, distribution and reproduction in any medium, provided the original work is properly cited.

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COUPLED FRACTIONAL WIGNER DISTRIBUTION WITH APPLICATIONS TO LFM SIGNALS

Abstract

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