M. M. Rodrigues scite author profile

In this paper we study the fundamental solution (FS) of the multidimensional time-fractional telegraph equation with time-fractional derivatives of orders α ∈]0, 1] and β ∈]1, 2] in the Caputo sense. Using the Fourier transform we obtain an integral representation of the FS expressed in terms of a multivariate MittagLeffler function in the Fourier domain. The Fourier inversion leads to a double Mellin-Barnes type integral representation and consequently to a H-function of two variables. An explicit series representation of the FS, depending on the parity of the dimension, is also obtained. As an application, we study a telegraph process with Brownian time. Finally, we present some moments of integer order of the FS, and some plots of the FS for some particular values of the dimension n and of the fractional parameters α and β.

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Numerical analysis of a two-parameter fractional telegraph equation

Ford

Rodrigues

Xiao

et al. 2013

Journal of Computational and Applied Mathematics

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Multiplicity of Solutions on a Nonlinear Eigenvalue Problem for p(x)-Laplacian-like Operators

Rodrigues

2011

Mediterr. J. Math.

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A higher dimensional fractional Borel‐Pompeiu formula and a related hypercomplex fractional operator calculus

Ferreira

Kraußhar

Rodrigues

et al. 2019

Math Methods in App Sciences

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In this paper, we develop a fractional integro‐differential operator calculus for Clifford algebra‐valued functions. To do that, we introduce fractional analogues of the Teodorescu and Cauchy‐Bitsadze operators, and we investigate some of their mapping properties. As a main result, we prove a fractional Borel‐Pompeiu formula based on a fractional Stokes formula. This tool in hand allows us to present a Hodge‐type decomposition for the fractional Dirac operator. Our results exhibit an amazing duality relation between left and right operators and between Caputo and Riemann‐Liouville fractional derivatives. We round off this paper by presenting a direct application to the resolution of boundary value problems related to Laplace operators of fractional order.

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First and Second Fundamental Solutions of the Time-Fractional Telegraph Equation with Laplace or Dirac Operators

Ferreira

Rodrigues

Vieira

2018

Adv. Appl. Clifford Algebras

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In this work we obtain the first and second fundamental solutions (FS) of the multidimensional timefractional equation with Laplace or Dirac operators, where the two time-fractional derivatives of orders α ∈]0, 1] and β ∈]1, 2] are in the Caputo sense. We obtain representations of the FS in terms of Hankel transform, double Mellin-Barnes integrals, and H-functions of two variables. As an application, the FS are used to solve Cauchy problems of Laplace and Dirac type.

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M. M. Rodrigues

Fundamental Solution of the Multi-Dimensional Time Fractional Telegraph Equation

Numerical analysis of a two-parameter fractional telegraph equation

Multiplicity of Solutions on a Nonlinear Eigenvalue Problem for p(x)-Laplacian-like Operators

A higher dimensional fractional Borel‐Pompeiu formula and a related hypercomplex fractional operator calculus

First and Second Fundamental Solutions of the Time-Fractional Telegraph Equation with Laplace or Dirac Operators

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