Analytical solution for the time-fractional telegraph equation.
Huang, F. (2009)
Journal of Applied Mathematics
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Displaying similar documents to “Application of two forms of generalized Taylor' theorem to Fox's H-function”
Analytical solution for the time-fractional telegraph equation.
On Fractional Helmholtz Equations
Samuel, M., Thomas, Anitha (2010)
Fractional Calculus and Applied Analysis
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MSC 2010: 26A33, 33E12, 33C60, 35R11 In this paper we derive an analytic solution for the fractional Helmholtz equation in terms of the Mittag-Leffler function. The solutions to the fractional Poisson and the Laplace equations of the same kind are obtained, again represented by means of the Mittag-Leffler function. In all three cases the solutions are represented also in terms of Fox's H-function.
Solutions of Fractional Diffusion-Wave Equations in Terms of H-functions
Boyadjiev, Lyubomir, Al-Saqabi, Bader (2012)
Mathematica Balkanica New Series
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MSC 2010: 35R11, 42A38, 26A33, 33E12 The method of integral transforms based on joint application of a fractional generalization of the Fourier transform and the classical Laplace transform is utilized for solving Cauchy-type problems for the time-space fractional diffusion-wave equations expressed in terms of the Caputo time-fractional derivative and the Weyl space-fractional operator. The solutions obtained are in integral form whose kernels are Green functions expressed...
α-Mellin Transform and One of Its Applications
Nikolova, Yanka (2012)
Mathematica Balkanica New Series
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MSC 2010: 35R11, 44A10, 44A20, 26A33, 33C45 We consider a generalization of the classical Mellin transformation, called α-Mellin transformation, with an arbitrary (fractional) parameter α > 0. Here we continue the presentation from the paper [5], where we have introduced the definition of the α-Mellin transform and some of its basic properties. Some examples of special cases are provided. Its operational properties as Theorem 1, Theorem 2 (Convolution theorem) and Theorem...
A note on fractional Sumudu transform.
Gupta, V.G., Shrama, Bhavna, Kiliçman, Adem (2010)
Journal of Applied Mathematics
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Integral Transforms Method to Solve a Time-Space Fractional Diffusion Equation
Nikolova, Yanka, Boyadjiev, Lyubomir (2010)
Fractional Calculus and Applied Analysis
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Mathematical Subject Classification 2010: 35R11, 42A38, 26A33, 33E12. The method of integral transforms based on using a fractional generalization of the Fourier transform and the classical Laplace transform is applied for solving Cauchy-type problem for the time-space fractional diffusion equation expressed in terms of the Caputo time-fractional derivative and a generalized Riemann-Liouville space-fractional derivative.
A detailed analysis for the fundamental solution of fractional vibration equation
Li-Li Liu, Jun-Sheng Duan (2015)
Open Mathematics
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In this paper, we investigate the solution of the fractional vibration equation, where the damping term is characterized by means of the Caputo fractional derivative with the order α satisfying 0 < α < 1 or 1 < α < 2. Detailed analysis for the fundamental solution y(t) is carried out through the Laplace transform and its complex inversion integral formula. We conclude that y(t) is ultimately positive, and ultimately decreases monotonically and approaches zero for the case...
Theorems on some families of fractional differential equations and their applications
Gülçin Bozkurt, Durmuş Albayrak, Neşe Dernek (2019)
Applications of Mathematics
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We use the Laplace transform method to solve certain families of fractional order differential equations. Fractional derivatives that appear in these equations are defined in the sense of Caputo fractional derivative or the Riemann-Liouville fractional derivative. We first state and prove our main results regarding the solutions of some families of fractional order differential equations, and then give examples to illustrate these results. In particular, we give the exact solutions for...
A relation between Mellin transform and Weyl (fractional) integral of two variables
N. C. Jain (1970)
Annales Polonici Mathematici
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Generalized Fractional Calculus, Special Functions and Integral Transforms: What is the Relation? Обобщения на дробното смятане, специалните функции и интегралните трансформации: Каква е връзката?
Kiryakova, Virginia (2011)
Union of Bulgarian Mathematicians
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Виржиния С. Кирякова - В този обзор илюстрираме накратко наши приноси към обобщенията на дробното смятане (анализ) като теория на операторите за интегриране и диференциране от произволен (дробен) ред, на класическите специални функции и на интегралните трансформации от лапласов тип. Показано е, че тези три области на анализа са тясно свързани и взаимно индуцират своето възникване и по-нататъшно развитие. За конкретните твърдения, доказателства и примери, вж. Литературата. ...
Fractional Calculus of P-transforms
Kumar, Dilip, Kilbas, Anatoly (2010)
Fractional Calculus and Applied Analysis
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MSC 2010: 44A20, 33C60, 44A10, 26A33, 33C20, 85A99 The fractional calculus of the P-transform or pathway transform which is a generalization of many well known integral transforms is studied. The Mellin and Laplace transforms of a P-transform are obtained. The composition formulae for the various fractional operators such as Saigo operator, Kober operator and Riemann-Liouville fractional integral and differential operators with P-transform are proved. Application of the P-transform...
Recent applications of fractional calculus to science and engineering.
Debnath, Lokenath (2003)
International Journal of Mathematics and Mathematical Sciences
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On fractional integration.
R.K. Saxena, S.L. Bora (1971)
Publications de l'Institut Mathématique [Elektronische Ressource]
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Discrete fractional calculus with the nabla operator.
Atici, F.M., Eloe, P. (2009)
Electronic Journal of Qualitative Theory of Differential Equations [electronic only]
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