Modified Sumudu Transform and Its Properties
Abstract
Keywords
References
- [1] M. U. Asiru, "Further properties of the Sumudu transform and its applications," International Journal of Mathematical Education in Science and Technology, vol. 33, no.3, pp. 441-449, 2002.
- [2] F. B. M. Belgacem, A. A. Karaballi, and S. L. Kalla, "Analytical investigations of the Sumudu transform and applications to integral production equations," Mathematical Problems in Engineering, vol. 2003, no.3, pp. 103-118, 2003.
- [3] F. B. M. Belgacem, "Introducing and analysing deeper Sumudu properties," Nonlinear Studies, vol. 13, no.1, pp. 23-41, 2006.
- [4] F. B. M. Belgacem, Karaballi, A. A. "Sumudu transform fundamental properties investigations and applications," International Journal of Stochastic Analysis, article id 91083, pp. 1-23, 2016.
- [5] L. Debnath, "Integral Transforms and Their Applications," CRC Press, Florida, 1995.
- [6] A. Kilicman, H. E. Gadian, "On the application of Laplace and Sumudu transforms," Journal of The Franklin Institute, vol. 347, pp. 848-862, 2010.
- [7] A. D. Poularikas, "The Transforms and Applications Handbook, The Electrical Engineering Handbook Series" CRC Press, Florida, 1996.
- [8] R. Saadeh, A. Qazza, A. Burqan, "A New Integral Transform: ARA Transform and Its Properties and Applications," Symmetry, vol. 12, article no.925, 2020.
Details
Primary Language
English
Subjects
Mathematical Sciences
Journal Section
Research Article
Authors
Uğur Duran
*
0000-0002-5717-1199
Türkiye
Publication Date
April 15, 2021
Submission Date
November 12, 2020
Acceptance Date
February 8, 2021
Published in Issue
Year 2021 Volume: 25 Number: 2
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