各向异性谐振子的Riesz均值最大化

Pub Date : 2017-12-29 DOI:10.4310/ARKIV.2019.V57.N1.A8
S. Larson
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引用次数: 4

摘要

研究平面上各向异性谐振子特征值的渐近极小化问题。我们特别研究了特征值的Riesz均值和相应热核的迹线。特征值最小化问题可以被重新表述为一个点阵问题,在这个点阵问题中,对于固定的$\lambda\geq 0$,人们希望最大化具有顶点$(0, 0), (0, \lambda \sqrt{\beta})$和$(\lambda/{\sqrt{\beta}}, 0)$的$(\mathbb{N}-\tfrac12)\times(\mathbb{N}-\tfrac12)$内部三角形相对于$\beta>0$的点的数量。这个问题的晶格点公式自然会引出一系列的广义问题,人们转而考虑位移晶格$(\mathbb{N}+\sigma)\times(\mathbb{N}+\tau)$,对于$\sigma, \tau >-1$。我们表明,这些问题的性质是相当不同的取决于移位参数,特别是问题对应于谐波振荡器,$\sigma=\tau=-\tfrac12$,是一个临界情况。
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Maximizing Riesz means of anisotropic harmonic oscillators
We consider problems related to the asymptotic minimization of eigenvalues of anisotropic harmonic oscillators in the plane. In particular we study Riesz means of the eigenvalues and the trace of the corresponding heat kernels. The eigenvalue minimization problem can be reformulated as a lattice point problem where one wishes to maximize the number of points of $(\mathbb{N}-\tfrac12)\times(\mathbb{N}-\tfrac12)$ inside triangles with vertices $(0, 0), (0, \lambda \sqrt{\beta})$ and $(\lambda/{\sqrt{\beta}}, 0)$ with respect to $\beta>0$, for fixed $\lambda\geq 0$. This lattice point formulation of the problem naturally leads to a family of generalized problems where one instead considers the shifted lattice $(\mathbb{N}+\sigma)\times(\mathbb{N}+\tau)$, for $\sigma, \tau >-1$. We show that the nature of these problems are rather different depending on the shift parameters, and in particular that the problem corresponding to harmonic oscillators, $\sigma=\tau=-\tfrac12$, is a critical case.
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