Invariant regions and global existence of solutions for reaction-diffusion systems with a tridiagonal matrix of diffusion coefficients and nonhomogeneous boundary conditions.

Salem, Abdelmalek. "Invariant regions and global existence of solutions for reaction-diffusion systems with a tridiagonal matrix of diffusion coefficients and nonhomogeneous boundary conditions.." Journal of Applied Mathematics 2007 (2007): Article ID 12375, 15 p.-Article ID 12375, 15 p.. <http://eudml.org/doc/55801>.

@article{Salem2007,
author = {Salem, Abdelmalek},
journal = {Journal of Applied Mathematics},
keywords = {three equations; Lyapunov functional methods; polynomial growth},
language = {eng},
pages = {Article ID 12375, 15 p.-Article ID 12375, 15 p.},
publisher = {Hindawi Publishing Corporation, New York},
title = {Invariant regions and global existence of solutions for reaction-diffusion systems with a tridiagonal matrix of diffusion coefficients and nonhomogeneous boundary conditions.},
url = {http://eudml.org/doc/55801},
volume = {2007},
year = {2007},
}

TY - JOUR
AU - Salem, Abdelmalek
TI - Invariant regions and global existence of solutions for reaction-diffusion systems with a tridiagonal matrix of diffusion coefficients and nonhomogeneous boundary conditions.
JO - Journal of Applied Mathematics
PY - 2007
PB - Hindawi Publishing Corporation, New York
VL - 2007
SP - Article ID 12375, 15 p.
EP - Article ID 12375, 15 p.
LA - eng
KW - three equations; Lyapunov functional methods; polynomial growth
UR - http://eudml.org/doc/55801
ER -