%0 Journal Article %1 citeulike:6502208 %A Aguirre-Ramirez, G. %A Oden, J. T. %D 1973 %J International Journal for Numerical Methods in Engineering %K 65n30-pdes-bvps-finite-elements 35k55-nonlinear-pde-of-parabolic-type %N 3 %P 345--355 %R 10.1002/nme.1620070311 %T Finite element technique applied to heat conduction in solids with temperature dependent thermal conductivity %U http://dx.doi.org/10.1002/nme.1620070311 %V 7 %X Consider a solid heat conductor with a non-linear constitutive equation for the heat flux. If the material is anisotropic and inhomogeneous, the heat conduction equation to be satisfied by the temperature field (x, t) is, Here L(, x) grad is a vector-valued function of , x, grad which is linear in grad , In the present paper, the application of the finite element method to the solution of this class of problems is demonstrated. General discrete models are developed which enable approximate solutions to be obtained for arbitrary three-dimensional regions and the following boundary and initial conditions: (a) prescribed surface temperature, (b) prescribed heat flux at the surface and (c) linear heat transfer at the surface. Numerical examples involve a homogeneous solid with a dimensionless temperature-diffusivity curve of the form = 0(l + T). The resulting system of non-linear differential equations is integrated numerically.

@article{citeulike:6502208, abstract = {{Consider a solid heat conductor with a non-linear constitutive equation for the heat flux. If the material is anisotropic and inhomogeneous, the heat conduction equation to be satisfied by the temperature field (x, t) is, Here L(, x) [grad ] is a vector-valued function of , x, grad which is linear in grad , In the present paper, the application of the finite element method to the solution of this class of problems is demonstrated. General discrete models are developed which enable approximate solutions to be obtained for arbitrary three-dimensional regions and the following boundary and initial conditions: (a) prescribed surface temperature, (b) prescribed heat flux at the surface and (c) linear heat transfer at the surface. Numerical examples involve a homogeneous solid with a dimensionless temperature-diffusivity curve of the form = 0(l + T). The resulting system of non-linear differential equations is integrated numerically.}}, added-at = {2017-06-29T07:13:07.000+0200}, author = {Aguirre-Ramirez, G. and Oden, J. T.}, biburl = {https://www.bibsonomy.org/bibtex/2c279a9ebdd0b28be754219480c2639fd/gdmcbain}, citeulike-article-id = {6502208}, citeulike-linkout-0 = {http://dx.doi.org/10.1002/nme.1620070311}, comment = {(private-note)Cited by Comini et al (1974)}, doi = {10.1002/nme.1620070311}, interhash = {a2fa7bbf8b82640c3b117a2d0011dabd}, intrahash = {c279a9ebdd0b28be754219480c2639fd}, issn = {0029-5981}, journal = {International Journal for Numerical Methods in Engineering}, keywords = {65n30-pdes-bvps-finite-elements 35k55-nonlinear-pde-of-parabolic-type}, number = 3, pages = {345--355}, posted-at = {2010-01-08 00:55:48}, priority = {2}, timestamp = {2020-01-08T23:56:23.000+0100}, title = {{Finite element technique applied to heat conduction in solids with temperature dependent thermal conductivity}}, url = {http://dx.doi.org/10.1002/nme.1620070311}, volume = 7, year = 1973 }