
1D Green's Functions For Heat Conduction Between Semiinfinite Slabs With Perfect and Imperfect Boundary Contact
17 Jan 2013  Papers  Contributor(s): Donald E. Amos
This document presents two derivations for 1D Green's functions
for semiinfinite slabs in contact along the boundary x=0. The case of
imperfect contact with a heat transfer coefficient h is...
http://nanohub.org/resources/15237

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...
http://nanohub.org/resources/13671

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
http://nanohub.org/resources/12856

1D Finite Different Method Conduction Heat Transfer Tool
01 Sep 2011  Tools  Contributor(s): Nicholas Roberts
Simple 1D Finite Difference Method Tool for Undergraduate Heat Transfer Course
http://nanohub.org/resources/1dfdmht

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...
http://nanohub.org/resources/12465

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. HajiSheik
http://nanohub.org/resources/12468

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
http://nanohub.org/resources/12390

Donald E. Amos
http://nanohub.org/members/59706

Analytic conduction solutions
01 Sep 2011  Tools  Contributor(s): Greg Walker, James Vere Beck
Highprecision analytic conduction in parallelepipeds using Green's functions
http://nanohub.org/resources/cond3d