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Amin Emamian
Researcher at University of Shahrood
Publications - 12
Citations - 140
Amin Emamian is an academic researcher from University of Shahrood. The author has contributed to research in topics: Thermal conduction & Boundary value problem. The author has an hindex of 5, co-authored 8 publications receiving 60 citations. Previous affiliations of Amin Emamian include Xi'an Jiaotong University.
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On 2D asymmetric heat conduction in functionally graded cylindrical segments: A general exact solution
TL;DR: In this paper, an exact analytical solution of steady-state heat conduction for the special case of a functionally graded (FG) cylindrical sector is presented, where Fourier theory is utilized to develop the steady state temperature field.
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Two-dimensional analytical solution for temperature distribution in FG hollow spheres: General thermal boundary conditions
TL;DR: In this article, an analytical solution for the steady-state heat transfer in a hollow sphere made of functionally graded material is obtained in the form of Bessel and Legendre functions.
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A closed-form solution for axisymmetric conduction in a finite functionally graded cylinder
TL;DR: In this paper, an exact general analytical solution for heat conduction problem in an axisymmetric cylinder made of functionally graded material whose thermal conductivity differs in two directions was derived by taking advantage of Sturm-Liouville theory to get a suitable Fourier transformation.
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A Comprehensive Review on Multi-Dimensional Heat Conduction of Multi-Layer and Composite Structures: Analytical Solutions
A. Amiri Delouei,Amin Emamian,H. Sajjadi,Meysam Atashafrooz,Yueming Li,Lian-Ping Wang,Lian-Ping Wang,Dengwei Jing,Gongnan Xie +8 more
TL;DR: In this paper, different existing analytical solutions for heat conduction in multi-layer and composite materials are reviewed and classified in rectangular, cylindrical, spherical, and conical coordinates.
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Two-dimensional temperature distribution in FGM sectors with the power-law variation in radial and circumferential directions
TL;DR: In this article, a steady-state analytical solution for the two-dimensional heat conduction in a cylindrical segment made of functionally graded materials is presented by taking advantage of the Fourier transform and separation of variables rather than numerical methods.