Special Affine Fourier Transform on Tempered Distribution and Its Application

被引：0

作者：

Kumar, Manish ^{[1
]}

Bhawna ^{[1
]}

机构：

[1] Birla Inst Technol & Sci Pilani, Dept Math, Hyderabad Campus, Hyderabad, Telangana, India

来源：

MATHEMATICAL METHODS IN THE APPLIED SCIENCES | 2025年 / 48卷 / 05期

关键词：

generalized telegraph equation; generalized wave equation; pseudo-differential operators; special affine Fourier transform; Schwartz space; Sobolev space; FRACTIONAL FOURIER; PSEUDODIFFERENTIAL OPERATOR; EIGENFUNCTIONS;

D O I：

10.1002/mma.10657

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The main aim of this work is to develop a theoretical framework for generalized pseudo-differential operators involving the special affine Fourier transform (SAFT), associated with a symbol delta(mu,eta)$$ \delta \left(\mu, \eta \right) $$. Some important properties of the SAFT are established, and it is proved that the product of two generalized pseudo-differential operators is shown to be a generalized pseudo-differential operator. Further, we explore the practical applications of the SAFT in solving generalized partial differential equations, such as the generalized telegraph and wave equations, providing closed-form solutions. Furthermore, graphical visualizations for these solutions are illustrated via MATLAB R2023b.

引用

页码：6092 / 6102

页数：11

共 50 条

[41] Fractional Clifford-Fourier Transform and its Application
Shi, Haipan
Yang, Heju
Li, Zunfeng
Qiao, Yuying
ADVANCES IN APPLIED CLIFFORD ALGEBRAS, 2020, 30 (05)
[42] FILTERING IN DISCRETE FOURIER-TRANSFORM AND ITS APPLICATION
UCHIDA, K
NODA, T
MATSUNAGA, T
ELECTRONICS AND COMMUNICATIONS IN JAPAN PART II-ELECTRONICS, 1994, 77 (02): : 46 - 55
[43] SYMMETRIC TERNARY QUANTUM FOURIER TRANSFORM AND ITS APPLICATION
Dong H.
Lu D.
Sun X.
Quantum Information and Computation, 2022, 22 (9-10): : 733 - 754
[44] The Fractional Fourier Transform and its Application to Digital Watermarking
Taba, Mohamed Tahar
2013 8TH INTERNATIONAL WORKSHOP ON SYSTEMS, SIGNAL PROCESSING AND THEIR APPLICATIONS (WOSSPA), 2013, : 262 - 266
[45] EVALUATION OF A SPECIAL FOURIER TRANSFORM
FANTE, RL
PROCEEDINGS OF THE INSTITUTE OF ELECTRICAL AND ELECTRONICS ENGINEERS, 1965, 53 (09): : 1223 - &
[46] Fourier transform distribution function of relaxation times; application and limitations
Boukamp, Bernard A.
ELECTROCHIMICA ACTA, 2015, 154 : 35 - 46
[47] Nonuniform Sampling in Lp-Subspaces Associated with the Multi-Dimensional Special Affine Fourier Transform
Jiang, Yingchun
Yang, Jing
AXIOMS, 2024, 13 (05)
[48] Asymmetric Cryptosystem Using Affine Transform in Fourier Domain
Anjana, Savita
Saini, Indu
Singh, Phool
Yadav, A. K.
ADVANCED COMPUTATIONAL AND COMMUNICATION PARADIGMS, VOL 2, 2018, 706 : 29 - 37
[49] A multicarrier architecture based upon the affine Fourier transform
Erseghe, T
Laurenti, N
Cellini, V
IEEE TRANSACTIONS ON COMMUNICATIONS, 2005, 53 (05) : 853 - 862
[50] When Ramanujan sums meet affine Fourier transform
Miao, Hongxia
Zhang, Feng
Tao, Ran
Peng, Mugen
SIGNAL PROCESSING, 2023, 206

← 1 2 3 4 5 →