(Un-)bounded transition fronts for the parabolic Anderson model and the randomized F-KPP equation

IF 1.4 2区 数学 Q2 STATISTICS & PROBABILITY
J. vCern'y, Alexander Drewitz, Lars Schmitz
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引用次数: 3

Abstract

We investigate the uniform boundedness of the fronts of the solutions to the randomized Fisher-KPP equation and to its linearization, the parabolic Anderson model. It has been known that for the standard (i.e. deterministic) Fisher-KPP equation, as well as for the special case of a randomized Fisher-KPP equation with so-called ignition type nonlinearity, one has a uniformly bounded (in time) transition front. Here, we show that this property of having a uniformly bounded transition front fails to hold for the general randomized Fisher-KPP equation. Nevertheless, we establish that this property does hold true for the parabolic Anderson model.
抛物型Anderson模型和随机F-KPP方程的(Un-)有界跃迁前沿
我们研究了随机Fisher KPP方程及其线性化抛物型Anderson模型解前沿的一致有界性。众所周知,对于标准(即确定性)Fisher KPP方程,以及具有所谓点火型非线性的随机化Fisher KPP方程式的特殊情况,具有一致有界(在时间上)跃迁前沿。在这里,我们证明了具有一致有界转移前沿的性质不适用于一般随机Fisher KPP方程。然而,我们证明了这个性质对于抛物型Anderson模型是成立的。
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来源期刊
Annals of Applied Probability
Annals of Applied Probability 数学-统计学与概率论
CiteScore
2.70
自引率
5.60%
发文量
108
审稿时长
6-12 weeks
期刊介绍: The Annals of Applied Probability aims to publish research of the highest quality reflecting the varied facets of contemporary Applied Probability. Primary emphasis is placed on importance and originality.
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