具有白噪声势的二维抛物型Anderson模型的长期渐近性

IF 1.5 Q2 PHYSICS, MATHEMATICAL Annales de l Institut Henri Poincare D Pub Date : 2020-09-24 DOI:10.1214/21-aihp1215
W. Konig, Nicolas Perkowski, W. V. Zuijlen
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引用次数: 13

摘要

我们考虑抛物线型安德森模型(PAM)。 $\partial_t u = \frac12 \Delta u + \xi u$ 在 $\mathbb R^2$ 具有高斯(空间)白噪声势 $\xi$. 我们证明了总质量在时间上的几乎确定的大时渐近行为 $t$,写的 $U(t)$,由 $\log U(t)\sim \chi t \log t$,带有确定性常数 $\chi$ 用变分公式表示。在一位作者的早期工作中,这个常数被用来描述特征值的渐近行为主狄利克雷 $\boldsymbol \lambda_1(Q_t)$ 安德森接线员的电话 $Q_t= [-\frac{t}{2},\frac{t}{2}]^2$ 通过 $\boldsymbol \lambda_1(Q_t)\sim\chi\log t$.
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Longtime asymptotics of the two-dimensional parabolic Anderson model with white-noise potential
We consider the parabolic Anderson model (PAM) $\partial_t u = \frac12 \Delta u + \xi u$ in $\mathbb R^2$ with a Gaussian (space) white-noise potential $\xi$. We prove that the almost-sure large-time asymptotic behaviour of the total mass at time $t$, written $U(t)$, is given by $\log U(t)\sim \chi t \log t$, with the deterministic constant $\chi$ identified in terms of a variational formula. In earlier work of one of the authors this constant was used to describe the asymptotic behaviour principal Dirichlet of the eigenvalue $\boldsymbol \lambda_1(Q_t)$ of the Anderson operator on the box $Q_t= [-\frac{t}{2},\frac{t}{2}]^2$ by $\boldsymbol \lambda_1(Q_t)\sim\chi\log t$.
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2.30
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0.00%
发文量
16
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