Add to ORKGIn this paper we give some background theory on the concept of fractional calculus, in particular the Riemann-Liouville operators. We then investigate the Taylor-Riemann series using Osler\u27s theorem and obtain certain double infinite series expansions of some elementary functions. In the process of this we give a proof of the convergence of an alternative form of Heaviside\u27s series. A Semi-Taylor series is introduced as the special case of the Taylor-Riemann series when \alpha=1/2, and some of its relations to special functions are obtained via certain generating functions arising in complex fractional calculus
We present a partial panoramic view of possible contexts and applications of the fractional calculus...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
Abstract: In this paper, we find the fractional Fourier series expansion of two type of fractional t...
In this paper we give some background theory on the concept of fractional calculus, in particular th...
AbstractAn interesting infinite series relation was proven recently by applying a certain known gene...
AbstractThe paper gives some results and improves the derivation of the fractional Taylor's series o...
AbstractThis paper describes an example of mathematical growth from scholarly curiousity to applicat...
AbstractIn this work the left and right Riemann–Liouville derivatives are introduced. A generalized ...
AbstractThe modified Riemann–Liouville fractional derivative applies to functions which are fraction...
Abstract: In this paper, we find the infinite series expressions for the values of some fractional a...
[[abstract]]Several interesting infinite series relations were derived recently by applying such ope...
In this paper we discuss fractional integrals and fractional derivatives of a function with respect...
Abstract: This paper studies the fractional differential problems of two types of fractional analyti...
Abstract: In this paper, based on Jumarie’s modified Riemann-Liouville (R-L) fractional derivative, ...
Abstract: In this paper, based on Jumarie’s modified Riemann-Liouville (R-L) fractional derivative a...
We present a partial panoramic view of possible contexts and applications of the fractional calculus...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
Abstract: In this paper, we find the fractional Fourier series expansion of two type of fractional t...
In this paper we give some background theory on the concept of fractional calculus, in particular th...
AbstractAn interesting infinite series relation was proven recently by applying a certain known gene...
AbstractThe paper gives some results and improves the derivation of the fractional Taylor's series o...
AbstractThis paper describes an example of mathematical growth from scholarly curiousity to applicat...
AbstractIn this work the left and right Riemann–Liouville derivatives are introduced. A generalized ...
AbstractThe modified Riemann–Liouville fractional derivative applies to functions which are fraction...
Abstract: In this paper, we find the infinite series expressions for the values of some fractional a...
[[abstract]]Several interesting infinite series relations were derived recently by applying such ope...
In this paper we discuss fractional integrals and fractional derivatives of a function with respect...
Abstract: This paper studies the fractional differential problems of two types of fractional analyti...
Abstract: In this paper, based on Jumarie’s modified Riemann-Liouville (R-L) fractional derivative, ...
Abstract: In this paper, based on Jumarie’s modified Riemann-Liouville (R-L) fractional derivative a...
We present a partial panoramic view of possible contexts and applications of the fractional calculus...
Abstract: In this paper, we use fractional Fourier series to solve three types of fractional integra...
Abstract: In this paper, we find the fractional Fourier series expansion of two type of fractional t...