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1-D Green's Functions For Heat Conduction Between Semi-infinite Slabs With Perfect and Imperfect Boundary Contact
17 Jan 2013 | Papers | Contributor(s): Donald E. Amos
This document presents two derivations for 1-D Green's functions
for semi-infinite slabs in contact along the boundary x=0. The case of
imperfect contact with a heat transfer coefficient h is...
Theory of Heat Conduction for Two Region Problems Using Green's Functions
03 Apr 2012 | Papers | Contributor(s): Donald E. Amos
This paper derives equations which describe transient temperature distributions in adjacent regions which share a common boundary. These regions consist of materials with distinct, constant...
Green's Functions For Heat Conduction in Adjacent Materials
11 Mar 2012 | Papers | Contributor(s): Donald E. Amos
This paper considers classical linear, transient heat conduction problems set in Regions 1 and 2 defined by the half planes x>0 and x
1D Finite Different Method Conduction Heat Transfer Tool
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15 Feb 2012 | Tools | Contributor(s): Nicholas Roberts
Simple 1D Finite Difference Method Tool for Undergraduate Heat Transfer Course
Transient Heat Conduction in Adjacent Quadrants Separated by a Thermal Resistance
19 Jan 2012 | Papers | Contributor(s): Donald E. Amos, James Vere Beck, Filippo de Monte
Abstract Two linear, transient heat conduction problems set in quadrants 1 and 2 of the (x,y) plane are solved. In each problem, the quadrants have distinct, constant physical properties and are...
Eigenvalues for analytic conduction solutions
07 Nov 2011 | Presentation Materials | Contributor(s): James Vere Beck, Greg Walker
A matlab script that is useful for calculating eigenvalues of cartesian geometries for boundary conditions of the first second and third kinds (XIJ) is provided.
J. V. Beck and A. Haji-Sheik
Transient Heat Conduction in Adjacent Materials Heated on Part of the Common Boundary
01 Nov 2011 | Papers | Contributor(s): Donald E. Amos
This paper considers a classical linear, transient heat conduction problem set in Regions 1 and 2 defined by the half planes x>0 and x
Donald E. Amos
Analytic conduction solutions
23 Sep 2011 | Tools | Contributor(s): Greg Walker, James Vere Beck
High-precision analytic conduction in parallelepipeds using Green's functions