Асосий контентга ўтиш
AkademIndex

Маҳсулотлар

Ишлаб чиқувчилар учун

AkademBaseЭкотизим учун очиқ API
Мақола

On a Fractional Operator Combining Proportional and Classical Differintegrals

Dumitru BǎleanuDepartment of Mathematics, Cankaya University, 06530 Balgat, Ankara, TurkeyArran FernandezDepartment of Mathematics, Faculty of Arts and Sciences, Eastern Mediterranean University, 99628 Famagusta, Northern Cyprus, via Mersin-10, TurkeyAli AkgülDepartment of Mathematics, Faculty of Arts and Sciences, Siirt University, TR-56100 Siirt, Turkey
2020en
ABI

Аннотация

The Caputo fractional derivative has been one of the most useful operators for modelling non-local behaviours by fractional differential equations. It is defined, for a differentiable function f ( t ) , by a fractional integral operator applied to the derivative f ′ ( t ) . We define a new fractional operator by substituting for this f ′ ( t ) a more general proportional derivative. This new operator can also be written as a Riemann–Liouville integral of a proportional derivative, or in some important special cases as a linear combination of a Riemann–Liouville integral and a Caputo derivative. We then conduct some analysis of the new definition: constructing its inverse operator and Laplace transform, solving some fractional differential equations using it, and linking it with a recently described bivariate Mittag-Leffler function.

Ҳали таржима қилинмаган

Идентификаторлар

Иқтибослар ва манбалар

6 та иқтибос0 та фойдаланилган манба