Topics
fractalDisease
heat transferCompany
In this paper the linear oscillator problem in fractal steady heat-transfer is studied within the local fractional theory. In particular, the local fractional Sumudu transform (LFST) will be used to solve both the homogeneous and the non-homogeneous local fractional oscillator equations (LFOEs) under fractal steady heat-transfer. It will be shown that the obtained non-differentiable solutions characterize the fractal phenomena with and without the driving force in fractal steady heat transfer at low excess temperatures. Key words: fractal heat transfer, oscillator equation, LFST, local fractiona
This paper points out a novel local fractional variational iteration method for pro-cessing the loca...
In this article, we begin with the non-homogeneous model for the non-differentiable heat flow, which...
The Fourier law of one-dimensional heat conduction equation in fractal media is investigated in this...
This article investigates several fractal heat transfer problems from the local fractional calcul...
In this paper, we propose the integrating factor method via local fractional derivative for the f...
In this paper we address the inverse problems for the fractal steady heat transfer described by t...
In this paper the fractal heat-transfer problem described by the theory of local fractional calcu...
In the article, the fractal heat-transfer models are described by the local fractional integral e...
In this article, the Sumudu transform series expansion method is used to handle the local fractio...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
In this article, the local fractional Homotopy perturbation method is utilized to solve the non-homo...
In this article, the local fractional Homotopy perturbation method is utilized to solve the non-homo...
In this article we consider the boundary value problems for differential equations in fractal hea...
This paper points out a novel local fractional variational iteration method for pro-cessing the loca...
In this article, we begin with the non-homogeneous model for the non-differentiable heat flow, which...
The Fourier law of one-dimensional heat conduction equation in fractal media is investigated in this...
This article investigates several fractal heat transfer problems from the local fractional calcul...
In this paper, we propose the integrating factor method via local fractional derivative for the f...
In this paper we address the inverse problems for the fractal steady heat transfer described by t...
In this paper the fractal heat-transfer problem described by the theory of local fractional calcu...
In the article, the fractal heat-transfer models are described by the local fractional integral e...
In this article, the Sumudu transform series expansion method is used to handle the local fractio...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
The fractal heat flow within local fractional derivative is investigated. The nonhomogeneous heat eq...
In this article, the local fractional Homotopy perturbation method is utilized to solve the non-homo...
In this article, the local fractional Homotopy perturbation method is utilized to solve the non-homo...
In this article we consider the boundary value problems for differential equations in fractal hea...
This paper points out a novel local fractional variational iteration method for pro-cessing the loca...
In this article, we begin with the non-homogeneous model for the non-differentiable heat flow, which...
The Fourier law of one-dimensional heat conduction equation in fractal media is investigated in this...
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