带有二次端点的浴盆势特征值的渐近展开

Yuzhou Zou
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引用次数: 0

摘要

我们考虑的是一维半经典薛定谔算子的特征值,其中的势由两个二次端(即在每个无限端看起来像一个谐振子)组成,中间可能有一个平坦区域。这样的势在二次导数中明显不连续。我们推导出一种渐近展开,它在高能态或半经典态中都有效,其前导阶项由玻尔-索默菲量子化条件给出,渐近展开由前导阶项的负幂次组成,系数在前导阶项中是振荡的。我们应用这一扩展来研究这一类势的古茨维勒迹公式和热核渐近公式的结果,从而了解非光滑势的迹公式的预期结果。
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Asymptotic Expansion of the Eigenvalues of a Bathtub Potential with Quadratic Ends
We consider the eigenvalues of a one-dimensional semiclassical Schr\"odinger operator, where the potential consist of two quadratic ends (that is, looks like a harmonic oscillator at each infinite end), possibly with a flat region in the middle. Such a potential notably has a discontinuity in the second derivative. We derive an asymptotic expansion, valid either in the high energy regime or the semiclassical regime, with a leading order term given by the Bohr-Sommerfeld quantization condition, and an asymptotic expansion consisting of negative powers of the leading order term, with coefficients that are oscillatory in the leading order term. We apply this expansion to study the results of the Gutzwiller Trace formula and the heat kernel asymptotic for this class of potentials, giving an idea into what results to expect for such trace formulas for non-smooth potentials.
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