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Main Author: Zhang, Mingmin
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.10580
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author Zhang, Mingmin
author_facet Zhang, Mingmin
contents We provide the first PDE proof of the celebrated Bramson's $o(1)$ results in 1983 concerning the large time asymptotics for the KPP equation under front-like initial data of types $x^{k+1}e^{-λ_*x}$ and $x^{\boldsymbolν} e^{-λx}$ as $x$ tends to infinity, where $0<λ<λ_*=\sqrt{f'(0)}$ and $k, \boldsymbolν\in\mathbb{R}$. Specifically, our results are the following: For the former type initial data, we prove that the position of the level sets is asymptotically $c_*t+\frac{k}{2λ_*}\ln t+\mathcal{O}(1)$ if $k>-3$, is $c_*t-\frac{3}{2λ_*}\ln t+\frac{1}{λ_*}\ln\ln t+\mathcal{O}(1)$ if $k=-3$, where $c_*=2λ_*$. In sharp contrast, if $k<-3$ and if $u_0$ belongs to $\mathcal{O}(x^{k+1}e^{-λ_* x})$ for $x$ large, then the position of the level sets behaves asymptotically like $c_*t-\frac{3}{2λ_*}\ln t+σ_\infty+o(1)$, with $σ_\infty\in\mathbb{R}$ depending on the initial condition $u_0$. Regarding the latter type initial data, we show that the level sets behave asymptotically like $ct+\frac{\boldsymbolν}λ\ln t$ up to $\mathcal{O}(1)$ error in general setting, with $c=λ+f'(0)/λ$. Under the $\mathcal{O}(1)$ results, the ``convergence along level sets'' results are also demonstrated. Moreover, we further refine the above $\mathcal{O}(1)$ results to the ``convergence to a traveling wave'' results provided that initial data decay precisely as a multiple of the above decaying rates.
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publishDate 2025
record_format arxiv
spellingShingle Sharp asymptotics for the KPP equation with some front-like initial data
Zhang, Mingmin
Analysis of PDEs
We provide the first PDE proof of the celebrated Bramson's $o(1)$ results in 1983 concerning the large time asymptotics for the KPP equation under front-like initial data of types $x^{k+1}e^{-λ_*x}$ and $x^{\boldsymbolν} e^{-λx}$ as $x$ tends to infinity, where $0<λ<λ_*=\sqrt{f'(0)}$ and $k, \boldsymbolν\in\mathbb{R}$. Specifically, our results are the following: For the former type initial data, we prove that the position of the level sets is asymptotically $c_*t+\frac{k}{2λ_*}\ln t+\mathcal{O}(1)$ if $k>-3$, is $c_*t-\frac{3}{2λ_*}\ln t+\frac{1}{λ_*}\ln\ln t+\mathcal{O}(1)$ if $k=-3$, where $c_*=2λ_*$. In sharp contrast, if $k<-3$ and if $u_0$ belongs to $\mathcal{O}(x^{k+1}e^{-λ_* x})$ for $x$ large, then the position of the level sets behaves asymptotically like $c_*t-\frac{3}{2λ_*}\ln t+σ_\infty+o(1)$, with $σ_\infty\in\mathbb{R}$ depending on the initial condition $u_0$. Regarding the latter type initial data, we show that the level sets behave asymptotically like $ct+\frac{\boldsymbolν}λ\ln t$ up to $\mathcal{O}(1)$ error in general setting, with $c=λ+f'(0)/λ$. Under the $\mathcal{O}(1)$ results, the ``convergence along level sets'' results are also demonstrated. Moreover, we further refine the above $\mathcal{O}(1)$ results to the ``convergence to a traveling wave'' results provided that initial data decay precisely as a multiple of the above decaying rates.
title Sharp asymptotics for the KPP equation with some front-like initial data
topic Analysis of PDEs
url https://arxiv.org/abs/2505.10580