QUASI NORMS INTEGRAL INEQUALITIES RELATED TO LAPLACE TRANSFORMATION
DOI Number
https://doi.org/10.22190/FUMI201203005B
First page
041
Last page
050
Abstract
In [4], the authors have proved the theorems 2.4 and 2.5 related to some integral inequalities via the Laplace transformation with the parameter p > 1. In
this manuscript, we propose new extension for integral inequalities related to Laplace transformation with two parameters p ; q and using the weight functions w; φ. We deduce some new inequalities linked to the Laplace transformation.
this manuscript, we propose new extension for integral inequalities related to Laplace transformation with two parameters p ; q and using the weight functions w; φ. We deduce some new inequalities linked to the Laplace transformation.
Keywords
Laplace transformation, integral inequalities, weight functions.
Full Text:
PDFReferences
B. Benaissa: On the Reverse Minkowski's Integral Inequality. Kragujevac. J. Math. Vol. 46 (3) (2022), 407-416.
B. Benaissa: Some new extension of Levinson's integral inequalities. Journal of Mathematical Extension. Vol. 15 (4) (2021), 1-17. https://doi.org/10.30495/JME.2021.1711
G. Hardy, J. Littlewood, and G. Polya: Inequalities. Cambridge University Press, (1952).
A. R. Moazzen and R. Lashkaripour: Some Inequalities Involving Laplace Transformation. J. Math. Extension, Vol. 8 (3) (2014), 1-15.
Joel L. Schiff: The Laplace Transform: Theory and Applications. Springer (1988).
DOI: https://doi.org/10.22190/FUMI201203005B
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ISSN 0352-9665 (Print)
ISSN 0352-9665 (Print)
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