A modified Laplace transform for certain generalized fractional operators
No Thumbnail Available
Date
2018
Authors
Journal Title
Journal ISSN
Volume Title
Publisher
Open Access Color
OpenAIRE Downloads
OpenAIRE Views
Abstract
It is known that Laplace transform converges for functions of exponential order. In order to extend the
possibility of working in a large class of functions, we present a modified Laplace transform that we call
ρ-Laplace transform, study its properties and prove its own convolution theorem. Then, we apply it to solve
some ordinary differential equations in the frame of a certain type generalized fractional derivatives. This
modified transform acts as a powerful tool in handling the kernels of these generalized fractional operators
Description
Keywords
Generalized Fractional Derivatives, Generalized Caputo, Ρ-Laplace Transform 2010 MSC, 26A33, 35A22, 44A10
Turkish CoHE Thesis Center URL
Fields of Science
Citation
Jarad, Fahd; Thabet, Abdeljawad, "A modified Laplace transform for certain generalized
fractional operators", Results in Nonlinear Analysis, No.2, pp.88-98, (2018).
WoS Q
Scopus Q
Q3
Source
Results in Nonlinear Analysis
Volume
Issue
2
Start Page
88
End Page
98
Collections
Google Scholar™
Sustainable Development Goals
7
AFFORDABLE AND CLEAN ENERGY
8
DECENT WORK AND ECONOMIC GROWTH
11
SUSTAINABLE CITIES AND COMMUNITIES
12
RESPONSIBLE CONSUMPTION AND PRODUCTION
15
LIFE ON LAND
17
PARTNERSHIPS FOR THE GOALS
