THERMAL SCIENCE

International Scientific Journal

Shu Xu

,

Xiang Ling

,

Yang ZhaoORCID

,

Hassan Kamil JassimORCID

A NOVEL SCHEDULE FOR SOLVING THE TWO-DIMENSIONAL DIFFUSION PROBLEM IN FRACTAL HEAT TRANSFER

ABSTRACT
In this work, the local fractional variational iteration method is employed to obtain approximate analytical solution of the two-dimensional diffusion equation in fractal heat transfer with help of local fractional derivative and integral operators.
KEYWORDS
variational iteration method, diffusion equation, fractal heat transfer, local fractional derivative
PAPER SUBMITTED: 2014-11-15
PAPER REVISED: 2015-01-22
PAPER ACCEPTED: 2015-02-12
PUBLISHED ONLINE: 2015-08-02
DOI REFERENCE: https://doi.org/10.2298/TSCI15S1S99X
CITATION EXPORT: view in browser or download as text file
THERMAL SCIENCE YEAR 2015, VOLUME 19, ISSUE Supplement, PAGES [99 - 103]
REFERENCES
[1] Yang, X. J., Advanced Local Fractional Calculus and Its Applications, World Science, New York, USA, 2012
[2] Hao, Y. J., et al., Helmholtz and Diffusion Equations Associated with Local Fractional Derivative Operators Involving the Cantorian and Cantor-Type Cylindrical Coordinates, Advances in Mathematical Physics, 2013 (2013), ID 754248, 10.1155/2013/754248
[3] Yang, X. J., et al., Mathematical Aspects of the Heisenberg Uncertainty Principle within Local Fractional Fourier Analysis, Boundary Value Problems, 2013 (2013), 1, pp. 1-16, 10.1186/1687-2770-2013-131
[4] Yang, X.-J., et al., Modeling Fractal Waves on Shallow Water Surfaces via Local Fractional Kortewegde Vries Equation, Abstract and Applied Analysis, 2014 (2014), ID 278672
[5] Yang, X. J., et al., Approximate Solutions for Diffusion Equations on Cantor Space-Time, Proceedings of the Romanian Academy, Series A, 14 (2013), 2, pp. 127-133
[6] Yang, A. M., et al., Local Fractional Series Expansion Method for Solving Wave and Diffusion Equations on Cantor Sets, Abstract and Applied Analysis, 2013 (2013), ID 351057, 10.1155/2013/351057
[7] Yang, X. J., et al., Local Fractional Variational Iteration Method for Diffusion and Wave Equations on Cantor Sets, Romanian Journal of Physics, 59 (2014), 1-2, pp. 36-48
[8] Cao, Y., et al., Local Fractional Functional Method for Solving Diffusion Equations on Cantor Sets, Abstract and Applied Analysis, 2014 (2014), ID 803693, 10.1155/2014/803693
[9] Yang, X. J., Baleanu, D., Fractal Heat Conduction Problem Solved by Local Fractional Variation Iteration Method, Thermal Science, 17 (2013), 2, pp. 625-628, 10.2298/tsci121124216y
[10] He, J.-H., Local Fractional Variational Iteration Method for Fractal Heat Transfer in Silk Cocoon Hierarchy, Nonlinear Science Letters A, 4 (2013), 1, pp. 15-20
[11] Su, W. H. et al., Damped Wave Equation and Dissipative Wave Equation in Fractal Strings within the Local Fractional Variational Iteration Method, Fixed Point Theory and Applications, 2013 (2013), 1, pp. 89-102, 10.1186/1687-1812-2013-89
[12] Yang, Y. J., et al., A Local Fractional Variational Iteration Method for Laplace Equation within Local Fractional Operators, Abstract and Applied Analysis, 2013 (2013), ID 202650, 10.1155/2013/202650
[13] Baleanu, D., et al., Local Fractional Variational Iteration and Decomposition Methods for Wave Equation on Cantor Sets within Local Fractional Operators, Abstract and Applied Analysis, 2014 (2014), ID 535048, 10.1155/2014/535048
[14] Baleanu, D., et al., Local Fractional Variational Iteration Algorithms for the Parabolic Fokker-Planck Equation Defined on Cantor Sets, Progress in Fractional Differentiation and Applications, 1 (2015), 1, pp. 1-11, 10.18576/pfda/110310
[15] Neamah, A. A., Local Fractional Variational Iteration Method for Solving Volterra Integro-Differential Equations with Local Fractional Operators, Journal of Mathematics and Statistics, 10 (2014), 3, pp. 401-407
[16] He, J.-H., A Tutorial Review on Fractal Space-Time and Fractional Calculus, International Journal of Theoretical Physics, 53 (2014), 11, pp. 3698-3718, 10.1007/s10773-014-2123-8
PDF VERSION [DOWNLOAD]
A novel schedule for solving the two-dimensional diffusion problem in fractal heat transfer

© 2026 Society of Thermal Engineers of Serbia. Published by the VinĨa Institute of Nuclear Sciences, National Institute of the Republic of Serbia, Belgrade, Serbia. This article is an open access article distributed under the terms and conditions of the Creative Commons Attribution-NonCommercial-NoDerivs 4.0 International licence