In this work we present an extension of Bell exponential polynomials to fractional and negative indices. This extension allows to calculate the fractional derivatives and fractional integrals of composite functions using the Faà di Bruno formul
Inspired by a number of recent investigations, we introduce the new analogues of the Apostol-Bernoul...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
In this paper, by using a generalization of beta function we introduced a new extension of Caputo fr...
The paper discusses the properties of the partial fractional integrals, the partial fractional deriv...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
AbstractThe well-known formula of Faà di Bruno’s for higher derivatives of a composite function has ...
AbstractAfter recalling the most important properties and applications of the Bell polynomials, we i...
Abstract: In this paper, based on Jumarie type of Riemann-Liouville (R-L) fractional calculus and a ...
Abstract: The subject of fractional calculus and its applications (that is, calculus of integrals an...
Abstract: In this paper, we obtain the limit representation of fractional exponential function. The ...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
We develop an extension of the classical Bell polynomials introducing the Laguerre-type version of t...
AbstractMaking use of a certain operator of fractional derivatives, a new subclass Tp(α, β, λ) of an...
Inspired by a number of recent investigations, we introduce the new analogues of the Apostol-Bernoul...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
In this paper, by using a generalization of beta function we introduced a new extension of Caputo fr...
The paper discusses the properties of the partial fractional integrals, the partial fractional deriv...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
AbstractThe well-known formula of Faà di Bruno’s for higher derivatives of a composite function has ...
AbstractAfter recalling the most important properties and applications of the Bell polynomials, we i...
Abstract: In this paper, based on Jumarie type of Riemann-Liouville (R-L) fractional calculus and a ...
Abstract: The subject of fractional calculus and its applications (that is, calculus of integrals an...
Abstract: In this paper, we obtain the limit representation of fractional exponential function. The ...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
We develop an extension of the classical Bell polynomials introducing the Laguerre-type version of t...
AbstractMaking use of a certain operator of fractional derivatives, a new subclass Tp(α, β, λ) of an...
Inspired by a number of recent investigations, we introduce the new analogues of the Apostol-Bernoul...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
In this paper, by using a generalization of beta function we introduced a new extension of Caputo fr...
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