Classical Properties on Conformable Fractional Calculus

Abstract: Recently, a definition of fractional which refers to classical calculus form called conformable fractional calculus has been introduced. The main idea of the concept of conformable fractional calculus is how to determine the derivative and integral with fractional order either rational numbers or real numbers. One of the most popular definitions of conformable fractional calculus is defined by Katugampola which is used in this study. This definition satisfies in some respects of classical calculus involved con… Show more

“…Before giving Chebyshev inequality using conformable derivative, mentioning about following results [16] that play a key role in our proof will provide a better understanding: If we take the derivative of both sides, we have From Corollory 10 g(x) 6 0. This is the contradiction.…”

Chebyshev inequality on conformable derivative

“…Before giving Chebyshev inequality using conformable derivative, mentioning about following results [16] that play a key role in our proof will provide a better understanding: If we take the derivative of both sides, we have From Corollory 10 g(x) 6 0. This is the contradiction.…”

Chebyshev inequality on conformable derivative

Comparison theorems of tempered fractional differential equations

Various Exact Solutions for the Conformable Time-Fractional Generalized Fitzhugh–Nagumo Equation with Time-Dependent Coefficients