Email this article On solvability of homogeneous Riemann–Hilbert problem with discontinuities of coefficients and two-sided curling at infinity of a logarithmic order
- Authors: Salimov R.B.1, Shabalin P.L.1
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Affiliations:
- Kazan State Architecture and Building University
- Issue: Vol 60, No 1 (2016)
- Pages: 30-41
- Section: Article
- URL: https://journals.rcsi.science/1066-369X/article/view/223441
- DOI: https://doi.org/10.3103/S1066369X16010047
- ID: 223441
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Abstract
We consider a homogeneous Riemann–Hilbert boundary-value problem for upper halfplane in the situation where its coefficients have countable set of discontinuities of jump type and two-side curling at infinity of a logarithmic order. We obtain general solution and describe completely its solvability in a special class of functions for the case where the index of the problem has power singularity of a logarithmic order.
About the authors
R. B. Salimov
Kazan State Architecture and Building University
Author for correspondence.
Email: salimov@5354.ru
Russian Federation, ul. Zelyonaya 1, Kazan, 420043
P. L. Shabalin
Kazan State Architecture and Building University
Email: salimov@5354.ru
Russian Federation, ul. Zelyonaya 1, Kazan, 420043
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