Low-lying eigenvalues of semiclassical Schrödinger operator with degenerate wells

Asymptot. Anal. Pub Date : 2018-02-08 DOI:10.3233/ASY-181493
J. Bony, N. Popoff
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引用次数: 2

Abstract

In this article, we consider the semiclassical Schr\"odinger operator $P = - h^{2} \Delta + V$ in $\mathbb{R}^{d}$ with confining non-negative potential $V$ which vanishes, and study its low-lying eigenvalues $\lambda_{k} ( P )$ as $h \to 0$. First, we give a necessary and sufficient criterion upon $V^{-1} ( 0 )$ for $\lambda_{1} ( P ) h^{- 2}$ to be bounded. When $d = 1$ and $V^{-1} ( 0 ) = \{ 0 \}$, we are able to control the eigenvalues $\lambda_{k} ( P )$ for monotonous potentials by a quantity linked to an interval $I_{h}$, determined by an implicit relation involving $V$ and $h$. Next, we consider the case where $V$ has a flat minimum, in the sense that it vanishes to infinite order. We give the asymptotic of the eigenvalues: they behave as the eigenvalues of the Dirichlet Laplacian on $I_{h}$. Our analysis includes an asymptotic of the associated eigenvectors and extends in particular cases to higher dimensions.
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具有退化井的半经典Schrödinger算子的低洼特征值
在本文中,我们考虑半经典Schrödinger算子 $P = - h^{2} \Delta + V$ 在 $\mathbb{R}^{d}$ 具有限制性非负电位 $V$ 哪个消失了,然后研究它的低特征值 $\lambda_{k} ( P )$ as $h \to 0$. 首先,我们给出了一个必要和充分的标准 $V^{-1} ( 0 )$ 为了 $\lambda_{1} ( P ) h^{- 2}$ 被限定。什么时候 $d = 1$ 和 $V^{-1} ( 0 ) = \{ 0 \}$,我们就能控制特征值 $\lambda_{k} ( P )$ 用一个与区间相联系的量来表示单调势 $I_{h}$,由隐含关系所决定 $V$ 和 $h$. 接下来,我们考虑 $V$ 有一个平坦的最小值,在这个意义上,它消失到无限的顺序。我们给出了特征值的渐近性:它们表现为狄利克雷拉普拉斯算子的特征值 $I_{h}$. 我们的分析包括相关特征向量的渐近,并在特定情况下扩展到更高的维度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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