具有可和势和不连续权函数的微分算子的研究

IF 0.5 Q3 MATHEMATICS
S. I. Mitrokhin
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引用次数: 0

摘要

. 本文提出了一种研究具有不连续权函数的微分算子的新方法。研究了具有分离边界条件和在权函数的不连续点处具有“匹配”条件的有限段上微分算子的谱性质。我们假定算子的势是在考虑算子的段上的可和函数。当谱参数值较大时,得到了相应微分方程基本解的渐近性。利用这种渐近性,我们研究了所考虑的微分算子的“匹配”条件。然后研究了所考虑算子的边界条件。结果,我们得到了一个算子的特征值方程,它是一个完整的函数。我们研究了特征值方程的指示图;这个图是一个正八边形。在指示图的各个扇区中,我们找到了所研究的微分算子的特征值的渐近性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Study of differential operator with summable potential and discontinuous weight function
. In the work we propose a new approach for studying differential operators with a discontinuous weight function. We study the spectral properties of a differential operator on a finite segment with separated boundary conditions and with “matching” condition at the discontinuity point of the weight function. We assume that the potential of the operator is a summable function on the segment, on which the operator is considered. For large value of the spectral parameter we obtain an asymptotics for the fundamental system of solutions of the corresponding differential equation. By means of this asymptotics we study the “matching” conditions of the considered differential operator. Then we study the boundary conditions of the considered operator. As a result, we obtain an equation for the eigenvalues of the operator, which an entire function. We study the indicator diagram of the equation for the eigenvalues; this diagram is a regular octagon. In various sectors of the indicator diagram we find the asymptotics for the eigenvalues of the studied differential operator.
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