Available in electronic format
Available in print format		 Journal of the American Mathematical Society
Journal of the American Mathematical Society
ISSN: 1088-6834(e) ISSN: 0894-0347(p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues
Previous Article
     

Sharp transition between extinction and propagation of reaction

Author(s): Andrej Zlatos
Journal: J. Amer. Math. Soc. 19 (2006), 251-263.
MSC (2000): Primary 35K57; Secondary 35K15
Posted: August 24, 2005
Retrieve article in: PDF

Abstract | References | Similar articles | Additional information

Abstract: We consider the reaction-diffusion equation

\begin{displaymath}T_t = T_{xx} + f(T) \end{displaymath}

on ${\mathbb{R} }$ with $T_0(x) \equiv \chi_{[-L,L]} (x)$ and $f(0)=f(1)=0$. In 1964 Kanel$^{\prime}$ proved that if $f$ is an ignition non-linearity, then $T\to 0$ as $t\to\infty$ when $L<L_0$, and $T\to 1$ when $L>L_1$. We answer the open question of the relation of $L_0$ and $L_1$ by showing that $L_0=L_1$. We also determine the large time limit of $T$ in the critical case $L=L_0$, thus providing the phase portrait for the above PDE with respect to a 1-parameter family of initial data. Analogous results for combustion and bistable non-linearities are proved as well.

References:

1.
D.G. Aronson and H.F. Weinberger, Nonlinear diffusion in population genetics, combustion, and nerve pulse propagation, Partial differential equations and related topics, Lecture Notes in Math. 446, Springer, Berlin, 1975. MR 0427837 (55:867)

2.
H. Berestycki, The influence of advection on the propagation of fronts in reaction-diffusion equations, Nonlinear PDEs in Condensed Matter and Reactive Flows, NATO Science Series C, 569, H. Berestycki and Y. Pomeau eds., Kluwer, Dordrecht, 2003.

3.
J. Busca, M.A. Jendoubi, and P. Polácik, Convergence to equilibrium for semilinear parabolic problems in $\Bbb R\sp N$, Comm. Partial Differential Equations 27 (2002), 1793-1814. MR 1941658 (2003m:35110)

4.
P. Constantin, A. Kiselev, and L. Ryzhik, Quenching of flames by fluid advection, Comm. Pure Appl. Math. 54 (2001), 1320-1342.MR 1846800 (2002f:35138)

5.
A. Fannjiang, A. Kiselev, and L. Ryzhik, Quenching of reaction by cellular flow, preprint.

6.
P.C. Fife and J.B. McLeod, The approach of solutions of nonlinear diffusion equations to travelling front solutions, Arch. Ration. Mech. Anal. 65 (1977), 335-361. MR 0442480 (56:862)

7.
R.A. Fisher, The advance of advantageous genes, Ann. of Eugenics 7 (1937), 355-369.

8.
Ja.I. Kanel$^{\prime}$, Stabilization of solutions of the Cauchy problem for equations encountered in combustion theory, Mat. Sb. (N.S.) 59 (101) 1962 suppl., 245-288. MR 0157130 (28:367)

9.
Ja.I. Kanel$^{\prime}$, Stabilization of the solutions of the equations of combustion theory with finite initial functions, Mat. Sb. (N.S.)65 (107) 1964 suppl., 398-413. MR 0177209 (31:1473)

10.
A. Kiselev and A. Zlatos, Quenching of combustion by shear flows, to appear in Duke Math. J.

11.
A.N. Kolmogorov, I.G. Petrovskii, and N.S. Piskunov, Étude de l'équation de la chaleur de matière et son application à un problème biologique, Bull. Moskov. Gos. Univ. Mat. Mekh. 1 (1937), 1-25.

12.
J. Nagumo, S. Arimoto, and S. Yoshizawa, An active pulse transmission line simulating nerve axon, Proc. Inst. Radio Eng. 50 (1962), 2061-2070.

13.
J.-M. Roquejoffre, Eventual monotonicity and convergence to travelling fronts for the solutions of parabolic equations in cylinders, Ann. Inst. H. Poincaré Anal. Non Linéaire 14 (1997), 499-552.MR 1464532 (98h:35107)

14.
J. Smoller, Shock Waves and Reaction-Diffusion Equations, Springer-Verlag, New York, 1994. MR 1301779 (95g:35002)

15.
J. Xin, Existence and nonexistence of travelling waves and reaction-diffusion front propagation in periodic media, J. Stat. Phys. 73 (1993), 893-926.MR 1251222 (94k:35155)

16.
J. Xin, Front propagation in heterogeneous media, SIAM Rev. 42 (2000), 161-230. MR 1778352 (2001i:35184)

17.
J.B. Zel'dovich and D.A. Frank-Kamenetskii, A theory of thermal propagation of flame, Acta Physiochimica USSR 9 (1938), 341-350.

18.
A. Zlatos, Quenching and propagation of combustion without ignition temperature cutoff, Nonlinearity 18 (2005), 1463-1475.

Similar Articles:

Retrieve articles in Journal of the American Mathematical Society with MSC (2000): 35K57, 35K15

Retrieve articles in all Journals with MSC (2000): 35K57, 35K15

Additional Information:

Andrej Zlatos
Affiliation: Department of Mathematics, University of Wisconsin, Madison, Wisconsin 53706
Email: zlatos@math.wisc.edu

DOI: 10.1090/S0894-0347-05-00504-7
PII: S 0894-0347(05)00504-7
Keywords: Reaction-diffusion equation, quenching, ignition non-linearity, bistable non-linearity
Received by editor(s): April 15, 2005
Posted: August 24, 2005
Copyright of article: Copyright 2005, American Mathematical Society
The copyright for this article reverts to public domain after 28 years from publication.

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2009, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google