The structure of internal layers for unstable nonlinear diffusion equations
Publication
, Journal Article
Witelski, TP
Published in: Studies in Applied Mathematics
January 1, 1996
We study the structure of diffusive layers in solutions of unstable nonlinear diffusion equations. These equations are regularizations of the forward-backward heat equation and have diffusion coefficients that become negative. Such models include the Cahn-Hilliard equation and the pseudoparabolic viscous diffusion equation. Using singular perturbation methods we show that the balance between diffusion and higher-order regularization terms uniquely determines the interface structure in these equations. It is shown that the well-known "equal area" rule for the Cahn-Hilliard equation is a special case of a more general rule for shock construction in the viscous Cahn-Hilliard equation.
Duke Scholars
Published In
Studies in Applied Mathematics
DOI
ISSN
0022-2526
Publication Date
January 1, 1996
Volume
97
Issue
3
Start / End Page
277 / 300
Related Subject Headings
- Mathematical Physics
- 4901 Applied mathematics
- 0102 Applied Mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Witelski, T. P. (1996). The structure of internal layers for unstable nonlinear diffusion equations. Studies in Applied Mathematics, 97(3), 277–300. https://doi.org/10.1002/sapm1996973277
Witelski, T. P. “The structure of internal layers for unstable nonlinear diffusion equations.” Studies in Applied Mathematics 97, no. 3 (January 1, 1996): 277–300. https://doi.org/10.1002/sapm1996973277.
Witelski TP. The structure of internal layers for unstable nonlinear diffusion equations. Studies in Applied Mathematics. 1996 Jan 1;97(3):277–300.
Witelski, T. P. “The structure of internal layers for unstable nonlinear diffusion equations.” Studies in Applied Mathematics, vol. 97, no. 3, Jan. 1996, pp. 277–300. Scopus, doi:10.1002/sapm1996973277.
Witelski TP. The structure of internal layers for unstable nonlinear diffusion equations. Studies in Applied Mathematics. 1996 Jan 1;97(3):277–300.
Published In
Studies in Applied Mathematics
DOI
ISSN
0022-2526
Publication Date
January 1, 1996
Volume
97
Issue
3
Start / End Page
277 / 300
Related Subject Headings
- Mathematical Physics
- 4901 Applied mathematics
- 0102 Applied Mathematics