Self-Adjoint Sturm-Liouville Dynamic Problem via Proportional Derivative

Tüba Gülşen, Mehmet Acar
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Abstract

The concept of a conformable derivative on time scales is a relatively new development in the field of fractional calculus. Traditional fractional calculus deals with derivatives and integrals of non-integer order on continuous time domains. However, time scale calculus extends these concepts to more general time domains that include both continuous and discrete points. The conformable derivative on time scales has several properties that make it advantageous in certain applications. For example, it satisfies a chain rule and has a simple relationship with the conformable integral, which facilitates the development of differential equations involving fractional order dynamics. It also allows for the analysis of systems with both continuous and discrete data points, making it suitable for modeling and control applications in various fields, including physics, engineering, and finance. In this study, the Sturm-Liouville problem and its properties are examined on an arbitrary time scale using the proportional derivative, a more general form of the fractional derivative. Important spectral properties such as self-adjointness, Green formula, Lagrange identity, Abel formula, and orthogonality of eigenfunctions for this problem are expressed in proportional derivatives on an arbitrary time scale.
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通过比例导数解决自相交 Sturm-Liouville 动态问题
时间尺度上的共形导数概念是分数微积分领域的一个相对较新的发展。传统的分数微积分处理连续时域上的非整阶导数和积分。然而,时标微积分将这些概念扩展到包括连续点和离散点的更一般时域。时标上的保角导数有几个特性,使其在某些应用中具有优势。例如,它满足链式规则,并与保角积分有简单的关系,这为涉及分数阶动力学的微分方程的发展提供了便利。此外,它还可以分析连续和离散数据点的系统,因此适用于物理、工程和金融等多个领域的建模和控制应用。在本研究中,使用比例导数(分数导数的更一般形式)在任意时间尺度上研究了 Sturm-Liouville 问题及其特性。该问题的自相接性、格林公式、拉格朗日特性、阿贝尔公式和特征函数的正交性等重要谱特性,都用任意时间尺度上的比例导数来表示。
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