Laplace–Elzaki Transform and its Properties with Applications to Integral and Partial Differential Equations
Keywords:
Laplace-Zaki transform
Laplace transform
Zaki transform
convolution (folding)
integral and partial differential equations
Abstract
Laplace-Elzaki transform (LET) as a double integral transform of a function of two variables was presented to solve some integral and partial differential equations. Main properties and theorems were proved. The convolution of two function and and the convolution theorem were discussed. The integral and partial differential equations were turned to algebraic ones by using (LET) and its properties. The results showed that the Laplace-Elzaki transform was more efficient and useful to handle such these kinds of equations.
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Published
2019-06-30
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1.
Laplace–Elzaki Transform and its Properties with Applications to Integral and Partial Differential Equations. JNSLAS [Internet]. 2019 Jun. 30 [cited 2024 Aug. 25];3(2):110-96. Available from: https://journals.ajsrp.com/index.php/jnslas/article/view/1271
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How to Cite
1.
Laplace–Elzaki Transform and its Properties with Applications to Integral and Partial Differential Equations. JNSLAS [Internet]. 2019 Jun. 30 [cited 2024 Aug. 25];3(2):110-96. Available from: https://journals.ajsrp.com/index.php/jnslas/article/view/1271
