Du, Yihong; Matano, Hiroshi

Author(s)

Du, Yihong

Matano, Hiroshi

Publication Date

2010

Abstract

We study the Cauchy problem ut = uxx + f(u) (t > 0, x ∈ ℝ¹), u(0, x) = uₒ(x) (x ∈ ℝ¹), where f(u) is a locally Lipschitz continuous function satisfying f(0) = 0. We show that any nonnegative bounded solution with compactly supported initial data converges to a stationary solution as t → ∞. Moreover, the limit is either a constant or a symmetrically decreasing stationary solution. We also consider the special case where f is a bistable nonlinearity and the case where f is a combustion type nonlinearity. Examining the behavior of a parameter-dependent solution uλ, we show the existence of a sharp threshold between extinction (i.e., convergence to 0) and propagation (i.e., convergence to 1). The result holds even if f has a jumping discontinuity at u = 1.

Citation

Journal of the European Mathematical Society, 12(2), p. 279-312

ISSN

1435-9863

1435-9855

Link

https://hdl.handle.net/1959.11/7468

Publisher

European Mathematical Society Publishing House

Title

Convergence and sharp thresholds for propagation in nonlinear diffusion problems

Type of document

Journal Article

Entity Type

Publication

Author(s)	Du, Yihong Matano, Hiroshi
Publication Date	2010
Abstract	We study the Cauchy problem ut = uxx + f(u) (t > 0, x ∈ ℝ¹), u(0, x) = uₒ(x) (x ∈ ℝ¹), where f(u) is a locally Lipschitz continuous function satisfying f(0) = 0. We show that any nonnegative bounded solution with compactly supported initial data converges to a stationary solution as t → ∞. Moreover, the limit is either a constant or a symmetrically decreasing stationary solution. We also consider the special case where f is a bistable nonlinearity and the case where f is a combustion type nonlinearity. Examining the behavior of a parameter-dependent solution uλ, we show the existence of a sharp threshold between extinction (i.e., convergence to 0) and propagation (i.e., convergence to 1). The result holds even if f has a jumping discontinuity at u = 1.
Citation	Journal of the European Mathematical Society, 12(2), p. 279-312
ISSN	1435-9863 1435-9855
Link	https://hdl.handle.net/1959.11/7468
Publisher	European Mathematical Society Publishing House
Title	Convergence and sharp thresholds for propagation in nonlinear diffusion problems
Type of document	Journal Article
Entity Type	Publication

Convergence and sharp thresholds for propagation in nonlinear diffusion problems

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