THERMAL SCIENCE

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Mehmet Yavuz

,

Necati Özdemir

NUMERICAL INVERSE LAPLACE HOMOTOPY TECHNIQUE FOR FRACTIONAL HEAT EQUATIONS

ABSTRACT
In this paper, we have aimed the numerical inverse Laplace homotopy technique for solving some interesting 1-D time-fractional heat equations. This method is based on the Laplace homotopy perturbation method, which is combined form of the Laplace transform and the homotopy perturbation method. Firstly, we have applied to the fractional 1-D PDE by using He’s polynomials. Then we have used Laplace transform method and discussed how to solve these PDE by using Laplace homotopy perturbation method. We have declared that the proposed model is very efficient and powerful technique in finding approximate solutions to the fractional PDE.
KEYWORDS
fractional heat equation, laplace transform, homotopy perturbation method, Caputo derivative
PAPER SUBMITTED: 2017-08-04
PAPER REVISED: 2017-11-15
PAPER ACCEPTED: 2017-11-20
PUBLISHED ONLINE: 2018-01-07
DOI REFERENCE: https://doi.org/10.2298/TSCI170804285Y
CITATION EXPORT: view in browser or download as text file
THERMAL SCIENCE YEAR 2018, VOLUME 22, ISSUE Supplement 1, PAGES [S185 - S194]
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Numerical inverse Laplace homotopy technique for fractional heat equations

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