Maximal determinants of Schrödinger operators on bounded intervals

C. Aldana, Jean-Baptiste Caillau, P. Freitas
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Abstract

We consider the problem of finding extremal potentials for the functional determinant of a one-dimensional Schrodinger operator defined on a bounded interval with Dirichlet boundary conditions under an $L^q$-norm restriction ($q\geq 1$). This is done by first extending the definition of the functional determinant to the case of $L^q$ potentials and showing the resulting problem to be equivalent to a problem in optimal control, which we believe to be of independent interest. We prove existence, uniqueness and describe some basic properties of solutions to this problem for all $q\geq 1$, providing a complete characterization of extremal potentials in the case where $q$ is one (a pulse) and two (Weierstrass's $\wp$ function).
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有界区间上Schrödinger算子的极大行列式
我们考虑在$L^q$ -范数限制($q\geq 1$)下,在Dirichlet边界条件下定义在有界区间上的一维薛定谔算子的泛函行列式的极值势问题。这是通过首先将功能行列式的定义扩展到$L^q$势的情况,并显示所产生的问题等同于最优控制问题来完成的,我们认为这是独立的兴趣。我们证明了所有$q\geq 1$解的存在唯一性,并描述了该问题解的一些基本性质,给出了$q$为1(脉冲)和2 (Weierstrass的$\wp$函数)的极值势的完整表征。
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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