SELECTING THE PARAMETRS SOIUTIONS OF LINEAR NON-CLASSISAL VOLTEPPA EQUATIONS OF THE FIRST KING

The Herald of KSUCTA, №2, Part 1, 2022 Pub Date : 2022-04-30 DOI:10.35803/1694-5298.2022.2.490-494

A. Asanov, S. M. Choyubekov

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Abstract

In many papers, various questions for integral equations have been investigated. In this paper, we have chosen a regularization parameter for solving the linear Volterra integral equation of the first kind. The aim of the study is to construct a regularizing operator and choose a regularization parameter. In the study, we have applied the concept of a derivative with respect to an increasing function, the regularization method according to M.M. Lavrentiev, methods of functional analysis, methods of transformation of equations, methods of integral and differential equations. The parameter for regularization is selected. Regularizing operator according to M.M. Lavrentiev is constructed and a uniqueness theorem is proved. The proposed methods can be used to study integral, integral-differential equations such as the Volterra integral equation of the first kind, as well as in the qualitative study of some applied processes in the field of physics, ecology, medicine, and the theory of complex systems control. They can be used in the further development of the theory of Volterra integral equations of the first kind. And also, when solving specific applied problems leading to equations of the first kind.

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第一类非经典线性volteppa方程参数解的选择

在许多论文中，研究了积分方程的各种问题。本文选择了正则化参数来求解第一类线性Volterra积分方程。研究的目的是构造正则化算子并选择正则化参数。在研究中，我们应用了递增函数的导数概念、拉夫连捷夫的正则化方法、泛函分析的方法、方程的变换方法、积分方程和微分方程的方法。选择正则化参数。构造了m.m.l avrentiev正则算子，并证明了一个唯一性定理。所提出的方法可用于研究第一类Volterra积分方程等积分微分方程，也可用于物理、生态学、医学和复杂系统控制理论等领域的一些应用过程的定性研究。它们可用于第一类Volterra积分方程理论的进一步发展。同样，当解决特定的应用问题时，会导致第一类方程。

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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The Herald of KSUCTA, №2, Part 1, 2022

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