Abstract:
A fractional differential operator Dα has a conformable property if Dα
(t) → f
′
(t)
when α → 1. So fractional calculus is a generalization of the classical one. Hence
many results and properties in classiborrowersulus are studied and generalized in the
fractional case.
In this thesis, we study many fractional derivatives that are based on the limit
definition, and in the particular conformable fractional derivative is considered as it
is the most popular definition used in the literature. Its main results and properties
are reviewed and summarized. In addition, many applications for different types of
fractional differential equations are provided.
Moreover, we study three specific fractional differential operators. In particular,
the UD-fractional derivative, the Exponential fractional derivative, and the Hyperbolic fractional derivative are introduced. In each one, the main properties and results
are investigated and proved. As applications, various kinds of fractional differential
equations based on these fractional operators are considered and solved.
Description:
CD, no of pages 80, 31644, ماجستير رياضيات 1/2023