Singular integral operators. The case of an unlimited contour

Singular integral operators. The case of an unlimited contour

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Let \(\Gamma\)be a closed or unclosed unlimited contour, a shift \(\alpha(t)\) maps homeomorphicly the contour \(\Gamma\) onto itself with preserving or reversing the direction on \(\Gamma\) and also satisfies the conditions: for some natural \(n\geq2\), \(\alpha_n(t)\equiv t\), and \(\alpha_j(t)\n...

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Bibliographic Details
Main Author:	V. Neaga
Format:	Article
Language:	English
Published:	Publishing House of the Romanian Academy 2005-08-01
Series:	Journal of Numerical Analysis and Approximation Theory
Subjects:	Lyapunov closed curves Noetherian singular integral piecewise Lyapunov contour singular integral equations singular operators with Cauchy kernel singular operators with shift
Online Access:	https://www.ictp.acad.ro/jnaat/journal/article/view/802

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