TY - JOUR
T1 - Traveling wavefronts for time-delayed reaction-diffusion equation
T2 - (I) Local nonlinearity
AU - Mei, Ming
AU - Lin, Chi Kun
AU - Lin, Chi Tien
AU - So, Joseph W.H.
N1 - Funding Information:
The authors would like to thank the anonymous referee for his helpful suggestions and comments, which lead us to have this improved stability result. The research of M.M. was supported in part by Natural Sciences and Engineering Research Council of Canada under the NSERC grant RGPIN 354724-08, the research of C.-K.L. was supported in part by National Science Council of Taiwan, ROC, under the grant 95-2115-M-009-019-MY3, and the research of C.-T.L. was supported in part by National Science Council of Taiwan, ROC, under the grants 96-2115-M-126-003 and 97-2115-M-126-002.
PY - 2009/7/15
Y1 - 2009/7/15
N2 - In this paper, we study a class of time-delayed reaction-diffusion equation with local nonlinearity for the birth rate. For all wavefronts with the speed c > c*, where c* > 0 is the critical wave speed, we prove that these wavefronts are asymptotically stable, when the initial perturbation around the traveling waves decays exponentially as x → - ∞, but the initial perturbation can be arbitrarily large in other locations. This essentially improves the stability results obtained by Mei, So, Li and Shen [M. Mei, J.W.-H. So, M.Y. Li, S.S.P. Shen, Asymptotic stability of traveling waves for the Nicholson's blowflies equation with diffusion, Proc. Roy. Soc. Edinburgh Sect. A 134 (2004) 579-594] for the speed c > 2 sqrt(Dm (ε p - dm)) with small initial perturbation and by Lin and Mei [C.-K. Lin, M. Mei, On travelling wavefronts of the Nicholson's blowflies equations with diffusion, submitted for publication] for c > c* with sufficiently small delay time r ≈ 0. The approach adopted in this paper is the technical weighted energy method used in [M. Mei, J.W.-H. So, M.Y. Li, S.S.P. Shen, Asymptotic stability of traveling waves for the Nicholson's blowflies equation with diffusion, Proc. Roy. Soc. Edinburgh Sect. A 134 (2004) 579-594], but inspired by Gourley [S.A. Gourley, Linear stability of travelling fronts in an age-structured reaction-diffusion population model, Quart. J. Mech. Appl. Math. 58 (2005) 257-268] and based on the property of the critical wavefronts, the weight function is carefully selected and it plays a key role in proving the stability for any c > c* and for an arbitrary time-delay r > 0.
AB - In this paper, we study a class of time-delayed reaction-diffusion equation with local nonlinearity for the birth rate. For all wavefronts with the speed c > c*, where c* > 0 is the critical wave speed, we prove that these wavefronts are asymptotically stable, when the initial perturbation around the traveling waves decays exponentially as x → - ∞, but the initial perturbation can be arbitrarily large in other locations. This essentially improves the stability results obtained by Mei, So, Li and Shen [M. Mei, J.W.-H. So, M.Y. Li, S.S.P. Shen, Asymptotic stability of traveling waves for the Nicholson's blowflies equation with diffusion, Proc. Roy. Soc. Edinburgh Sect. A 134 (2004) 579-594] for the speed c > 2 sqrt(Dm (ε p - dm)) with small initial perturbation and by Lin and Mei [C.-K. Lin, M. Mei, On travelling wavefronts of the Nicholson's blowflies equations with diffusion, submitted for publication] for c > c* with sufficiently small delay time r ≈ 0. The approach adopted in this paper is the technical weighted energy method used in [M. Mei, J.W.-H. So, M.Y. Li, S.S.P. Shen, Asymptotic stability of traveling waves for the Nicholson's blowflies equation with diffusion, Proc. Roy. Soc. Edinburgh Sect. A 134 (2004) 579-594], but inspired by Gourley [S.A. Gourley, Linear stability of travelling fronts in an age-structured reaction-diffusion population model, Quart. J. Mech. Appl. Math. 58 (2005) 257-268] and based on the property of the critical wavefronts, the weight function is carefully selected and it plays a key role in proving the stability for any c > c* and for an arbitrary time-delay r > 0.
KW - Reaction-diffusion equation
KW - Stability
KW - Time-delay
KW - Traveling waves
UR - http://www.scopus.com/inward/record.url?scp=67349120854&partnerID=8YFLogxK
U2 - 10.1016/j.jde.2008.12.026
DO - 10.1016/j.jde.2008.12.026
M3 - Article
AN - SCOPUS:67349120854
SN - 0022-0396
VL - 247
SP - 495
EP - 510
JO - Journal of Differential Equations
JF - Journal of Differential Equations
IS - 2
ER -