Estimates of Eigenvalues and Approximation Numbers for a Class of Degenerate Third-Order Partial Differential Operators

Axioms Pub Date : 2024-07-03 DOI:10.3390/axioms13070451
M. Muratbekov, A. Suleimbekova, Mukhtar Baizhumanov
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Abstract

In this paper, we study the spectral properties of a class of degenerate third-order partial differential operators with variable coefficients presented in a rectangle. Conditions are found to ensure the existence and compactness of the inverse operator. A theorem on estimates of approximation numbers is proven. Here, we note that finding estimates of approximation numbers, as well as extremal subspaces, for a set of solutions to the equation is a task that is certainly important from both a theoretical and a practical point of view. The paper also obtained an upper bound for the eigenvalues. Note that, in this paper, estimates of eigenvalues and approximation numbers for the degenerate third-order partial differential operators are obtained for the first time.
一类畸变三阶偏微分算子的特征值和近似数估计值
本文研究了一类在矩形中呈现可变系数的退化三阶偏微分算子的谱特性。我们找到了确保逆算子存在和紧凑的条件。证明了关于近似数估计值的定理。在此,我们指出,为方程组的解寻找近似数估计值以及极值子空间,无论从理论还是实践角度来看,都是一项非常重要的任务。本文还获得了特征值的上界。请注意,本文首次获得了退化三阶偏微分算子的特征值和近似数的估计值。
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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