Open AccessSHIFTED GEGENBAUER OPERATIONAL MATRIX AND ITS APPLICATIONS FOR SOLVING FRACTIONAL DIFFERENTIAL EQUATIONS
Author(s) -
T. M. ElGindy,
Hoda F. Ahmed,
Marina B. Melad
Publication year - 2018
Publication title -
journal of the egyptian mathematical society
Language(s) - English
Resource type - Journals
eISSN - 2090-9128
pISSN - 1110-256X
DOI - 10.21608/jomes.2018.9463
Subject(s) - mathematics , algebraic equation , fractional calculus , matrix (chemical analysis) , order (exchange) , differential equation , mathematical analysis , physics , nonlinear system , materials science , composite material , finance , quantum mechanics , economics
This paper introduces a new numerical mechanism for solving multi- order fractional di
erential equations (MOFDEs)and systems of fractional di
erential equations, in which the fractional derivatives are expressed in Riemman- liouville(RL) sense. A new shifted ultraspherical (Gegenbauer) operational matrix (SGOM) of fractional integration of arbitraryorder is induced. By using this matrix jointly with the Tau method, the solution of fractional di
erential equation (FDE)is decreased to the solution of a system of algebraic equations (AEs). Helpful problems are built-in to show the powerfuland validity of the proposed technique.
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