Some classes of singular integral equations of convolution type in the class of exponentially increasing functions

Some classes of singular integral equations of convolution type in the class of exponentially increasing functions

Abstract In this article, we study some classes of singular integral equations of convolution type with Cauchy kernels in the class of exponentially increasing functions. Such equations are transformed into Riemann boundary value problems on either a straight line or two parallel straight lines by F...

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Bibliographic Details
Main Author: Pingrun Li
Format: Article
Language:English
Published: SpringerOpen 2017-12-01
Series:Journal of Inequalities and Applications
Subjects:
singular integral equations
Riemann boundary value problems
dual type
convolution kernel
the class of exponentially increasing functions
Online Access:http://link.springer.com/article/10.1186/s13660-017-1580-z
Description
Summary:Abstract In this article, we study some classes of singular integral equations of convolution type with Cauchy kernels in the class of exponentially increasing functions. Such equations are transformed into Riemann boundary value problems on either a straight line or two parallel straight lines by Fourier transformation. We propose one method different from the classical one for the study of such problems and obtain the general solutions and the conditions of solvability. Thus, the result in this paper improves the theory of integral equations and the classical boundary value problems for analytic functions.
ISSN:1029-242X

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