Ceren Ustaoğlu scite author profile

Ceren Ustaoğlu

5Publications

70Citation Statements Received

144Citation Statements Given

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144

Affiliations

Final International University, Eastern Mediterranean University

Publications

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On some analytic properties of tempered fractional calculus

Fernandez

Ustaoğlu

2020

Journal of Computational and Applied Mathematics

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We consider the integral and derivative operators of tempered fractional calculus, and examine their analytic properties. We discover connections with the classical Riemann-Liouville fractional calculus and demonstrate how the operators may be used to obtain special functions such as hypergeometric and Appell's functions. We also prove an analogue of Taylor's theorem and some integral inequalities to enrich the mathematical theory of tempered fractional calculus.

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Some Incomplete Hypergeometric Functions and Incomplete Riemann-Liouville Fractional Integral Operators

Özarslan¹,

Ustaoğlu²

2019

Mathematics

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Very recently, the incomplete Pochhammer ratios were defined in terms of the incomplete beta function B y ( x , z ) . With the help of these incomplete Pochhammer ratios, we introduce new incomplete Gauss, confluent hypergeometric, and Appell’s functions and investigate several properties of them such as integral representations, derivative formulas, transformation formulas, and recurrence relations. Furthermore, incomplete Riemann-Liouville fractional integral operators are introduced. This definition helps us to obtain linear and bilinear generating relations for the new incomplete Gauss hypergeometric functions.

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Incomplete Caputo fractional derivative operators

Özarslan

Ustaoğlu

2018

Adv Differ Equ

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The main aim of this paper is to give the definitions of Caputo fractional derivative operators and show their use in the special function theory. For this purpose, we introduce new types of incomplete hypergeometric functions and obtain their integral representations. Furthermore, we define incomplete Caputo fractional derivative operators and show that the images of some elementary functions under the action of incomplete Caputo fractional operators give a new type of incomplete hypergeometric functions. This definition helps us to obtain linear and bilinear generating relations for the new type incomplete Gauss hypergeometric functions.

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On the analytical development of incomplete Riemann–Liouville fractional calculus

Fernandez¹,

Ustaoğlu²,

Özarslan³

2021

Turk J Math

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The theoretical development of fractional calculus includes the formulation of different definitions, the extension of properties from standard calculus, and the application of fractional operators to special functions. In two recent papers, incomplete versions of classical fractional operators were formulated in connection with special functions.Here, we develop the theory of incomplete fractional calculus more deeply, investigating further properties of these operators and answering some fundamental questions about how they work. By considering appropriate function spaces, we discover that incomplete fractional calculus may be used to analyse a wider class of functions than classical fractional calculus can consider. By using complex analytic continuation, we formulate definitions for incomplete Riemann-Liouville fractional derivatives, hence extending the incomplete integrals to a fully-fledged model of fractional calculus. Further properties proved here include a rule for incomplete differintegrals of products, and composition properties of incomplete differintegrals with classical calculus operations.

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Extended incomplete version of hypergeometric functions

Ali

Ustaoğlu²

2020

Filomat

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Recently, the incomplete Pochhammer ratios are defined in terms of incomplete beta and gamma functions [10]. In this paper, we introduce the extended incomplete version of Pochhammer symbols in terms of the generalized incomplete gamma functions. With the help of this extended incomplete version of Pochhammer symbols we introduce the extended incomplete version of Gauss hypergeometric and Appell?s functions and investigate several properties of them such as integral representations, derivative formulas, transformation formulas, Mellin transforms and log convex properties. Furthermore, we investigate incomplete fractional derivatives for extended incomplete version of some elementary functions.

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Ceren Ustaoğlu

On some analytic properties of tempered fractional calculus

Some Incomplete Hypergeometric Functions and Incomplete Riemann-Liouville Fractional Integral Operators

Incomplete Caputo fractional derivative operators

On the analytical development of incomplete Riemann–Liouville fractional calculus

Extended incomplete version of hypergeometric functions

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