Local fractional Laplace variational iteration method for nonhomogeneous heat equations arising in fractal heat flow
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Publication:1719386
DOI10.1155/2014/914725zbMath1407.65321OpenAlexW2145934012WikidataQ58101205 ScholiaQ58101205MaRDI QIDQ1719386
Yang Zhao, Shu Xu, Xiang Ling, Carlo Cattani, Xiao-Jun Yang, Gong-Nan Xie
Publication date: 8 February 2019
Published in: Mathematical Problems in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2014/914725
Numerical methods for partial differential equations, boundary value problems (65N99) Fractional partial differential equations (35R11)
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A finite difference method for fractional diffusion equations with Neumann boundary conditions ⋮ An iterative numerical method for Fredholm-Volterra integral equations of the second kind
Cites Work
- Unnamed Item
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- Analytical solutions for heat transfer on fractal and pre-fractal domains
- The use of Sumudu transform for solving certain nonlinear fractional heat-like equations
- Cantor-type cylindrical-coordinate method for differential equations with local fractional derivatives
- One-phase problems for discontinuous heat transfer in fractal media
- Systems of Navier-Stokes equations on Cantor sets
- Solutions of the space-time fractional Cattaneo diffusion equation
- Fractional order theory of thermoelasticity
- The Yang-Laplace transform for solving the IVPs with local fractional derivative
- Analytical solutions of the one-dimensional heat equations arising in fractal transient conduction with local fractional derivative
- Mathematical aspects of the Heisenberg uncertainty principle within local fractional Fourier analysis
- Local fractional Laplace variational iteration method for solving linear partial differential equations with local fractional derivative
- Fractional diffusion and fractional heat equation
- Fractional heat equation and the second law of thermodynamics
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