呈指数型增长的函数类中的Volterra奇异积分方程的解的存在性

doi:10.13371/j.cnki.chin.q.j.m.2025.02.002

数学季刊 ›› 2025, Vol. 40 ›› Issue (2): 135-147.doi: 10.13371/j.cnki.chin.q.j.m.2025.02.002

呈指数型增长的函数类中的Volterra奇异积分方程的解的存在性

School of Mathematical Sciences, Qufu Normal University, Qufu 273165, China

收稿日期:2024-06-20 出版日期:2025-06-30 发布日期:2025-06-30
作者简介:ZHANG Wen-wen (2000-), female, native of Weifang, Shandong, graduate student of Qufu Normal University, under postgraduate, engages in the boundary value problem of analytic function and singular integral equation; LI Ping-run (1966-), male, native of Yanzhou, Shandong, professor of Qufu Normal University, Ph.D., engages in the boundary value problem of analytic function, singular integral equation and Clifford analysis.
基金资助:
Supported by National Natural Science Foundation of China (Grant No. 11971015)

xistence of Solutions for Volterra Singular Integral Equations in the Class of Exponentially Increasing Functions

School of Mathematical Sciences, Qufu Normal University, Qufu 273165, China

Received:2024-06-20 Online:2025-06-30 Published:2025-06-30
About author:ZHANG Wen-wen (2000-), female, native of Weifang, Shandong, graduate student of Qufu Normal University, under postgraduate, engages in the boundary value problem of analytic function and singular integral equation; LI Ping-run (1966-), male, native of Yanzhou, Shandong, professor of Qufu Normal University, Ph.D., engages in the boundary value problem of analytic function, singular integral equation and Clifford analysis.
Supported by:
Supported by National Natural Science Foundation of China (Grant No. 11971015)

摘要/Abstract

摘要： The goal of this paper is to investigate the theory of Noether solvability for Volterra singular integral equations (VSIEs) with convolution and Cauchy kernels in a more general function class. To obtain the analytic solutions, we transform such equations into boundary value problems with discontinuous coefficients by the properties of Fourier analysis. In view of the analytical Riemann-Hilbert method, the generalized Liouville theorem and Sokhotski-Plemelj formula, we get the uniqueness and existence of solutions for such problems, and study the asymptotic property of solutions at nodes. Therefore, this paper improves the theory of singular integral equations and boundary value problems.

关键词: Volterra singular integral equations, The theory of Noether solvability, The class of exponentially increasing functions, Riemann-Hilbert method

Abstract: The goal of this paper is to investigate the theory of Noether solvability for Volterra singular integral equations (VSIEs) with convolution and Cauchy kernels in a more general function class. To obtain the analytic solutions, we transform such equations into boundary value problems with discontinuous coefficients by the properties of Fourier analysis. In view of the analytical Riemann-Hilbert method, the generalized Liouville theorem and Sokhotski-Plemelj formula, we get the uniqueness and existence of solutions for such problems, and study the asymptotic property of solutions at nodes. Therefore, this paper improves the theory of singular integral equations and boundary value problems.

Key words: Volterra singular integral equations, The theory of Noether solvability, The class of exponentially increasing functions, Riemann-Hilbert method

中图分类号:

O174.5

张雯雯, 李平润. 呈指数型增长的函数类中的Volterra奇异积分方程的解的存在性[J]. 数学季刊, 2025, 40(2): 135-147.

ZHANG Wen-wen, LI Ping-run. xistence of Solutions for Volterra Singular Integral Equations in the Class of Exponentially Increasing Functions[J]. Chinese Quarterly Journal of Mathematics, 2025, 40(2): 135-147.

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呈指数型增长的函数类中的Volterra奇异积分方程的解的存在性

xistence of Solutions for Volterra Singular Integral Equations in the Class of Exponentially Increasing Functions

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