Abstract
We present a brief review of results on the homogeneous Riemann boundary value problem for analytic functions with very general boundary data.
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REFERENCES
F. D. Gakhov, Boundary Value Problems (Dover, New York, 1990).
N. I. Muskhelishvili, Singular Integral Equations. Boundary Problems of Function Theory and Their Application to Mathematical Physics (Dover, New York, 1992).
Jian-Ke Lu, Boundary Value Problems for Holomorphic Functions, Vol. 16 of Series in Pure Mathematics (World Scientific, Singapore, 1993).
D. Peña Peña and J. Bory Reyes, ‘‘Riemann boundary value problem on a regular open curve,’’ J. Nat. Geom. 22 (1–2), 1–18 (2002).
R. K. Seifullaev, ‘‘Solvability of a homogeneous Riemann boundary value problem on an open curve,’’ in Theory of Functions and Approximations, Part 2 (Saratov. Gos. Univ., Saratov, 1983), pp. 140–143 [in Russian].
R. K. Seifullaev, ‘‘A Riemann boundary value problem on a nonsmooth open curve,’’ Mat. Sb. (N.S.) 112 (154), 147–161 (1980).
R. K. Seifullaev, ‘‘Relationship of the number of linearly independent solutions of a Riemann boundary value problem to properties of the jump curve,’’ Uch. Zap. Azerb. Univ., No. 6, 14–20 (1978).
K. Kutlu, ‘‘On characteristic adjoint singular integral equation of Riemann boundary value problem,’’ An. Univ. Timişoara Ser. Mat.-Inform. 41, 125–129 (2003).
K. Kutlu, ‘‘On Riemann boundary value problem,’’ An. Univ. Timişoara Ser. Mat.-Inform. 38 (1), 89–96 (2000).
K. Kutlu, ‘‘On Riemann boundary value problem,’’ J. Indian Acad. Math. 21, 181–191 (1999).
E. A. Danilov, ‘‘Dependence of the number of solutions of a homogeneous Riemann problem on the contour and the coefficient module,’’ Dokl. Akad. Nauk SSSR 264, 1305–1308 (1982).
M. S. Salim, ‘‘Necessary and sufficient conditions for continuity of an integral of Cauchy type up to the boundary along a nonsmooth open curve,’’ Uch. Zap. Azerb. Univ., Mat. Fiz. Ser., No. 3, 75–83 (1979).
M. S. Selim, ‘‘The homogeneous Riemann problem on a nonsmooth open curve,’’ Uch. Zap. Azerb. Univ., Mat. Fiz. Ser., No. 5, 12–22 (1979).
B. González Diéguez and J. Bory Reyes, ‘‘The homogeneous Riemann boundary value problem on rectifiable open Jordan curves,’’ Cienc. Mat. (Havana) 9 (2), 3–9 (1988).
J. Bory Reyes and B. González Diéguez, ‘‘On the classical formulation of solvability of the Riemann boundary value problem,’’ Cienc. Mat. (Havana) 10 (1), 65–73 (1989).
J. Bory Reyes, ‘‘On the Riemann boundary problem on open rectifiable Jordan curves,’’ Cienc. Mat. (Havana) 11, 211–220 (1990).
B. A. Kats, ‘‘Conditions for the solvability of a homogeneous Riemann problem on a nonsmooth curve of infinite length,’’ Izv. Vyssh. Uchebn. Zaved., Mat., No. 6, 75–77 (1982).
B. A. Kats, ‘‘The Riemann problem on an open Jordan curve,’’ Sov. Math. (Iz. VUZ) 27 (12), 33–44 (1983).
B. A. Kats, ‘‘Zigzags and spirals in boundary-value problems,’’ Russ. Math. 63, 33–40 (2019).
B. A. Kats and D. B. Katz, ‘‘Cauchy–Hadamard integral with applications,’’ Monatsh Math. 189, 683–689 (2019).
L. Zhixin and B. A. Kats, ‘‘Riemann boundary-value problem on Cassini spirals,’’ Probl. Anal. Issues Anal. 10 (28), 101–110 (2021).
I. I. Privalov, Edge Properties of Analytical Functions, Vol. 25 of University Books for Mathematics (Deutscher Verlag der Wissenschaften, Berlin, 1956).
P. Painlev\(\grave{e}\), ‘‘Sur les lignes singuliéres des fonctions analytiques,’’ Ann. Fac. Sci. Toulouse Sci. Math. Sci. Phys. 2, B1–B130 (1888).
A. I. Markushevich, Selected Chapters in the Theory of Analytic Functions (Nauka, Moscow, 1976) [in Russian].
E. P. Dolzhenko, ‘‘The removability of singularities of analytic functions,’’ Usp. Mat. Nauk 18, 135–142 (1963).
J. Bory Reyes, ‘‘A note on the solvability of homogeneous Riemann boundary problem with infinity index,’’ Commun. Math. (2021, accepted).
ACKNOWLEDGMENTS
This paper is dedicated to the memory of Professor Dr. Boris Aleksandrovich Kats and his outstanding legacy in the field of Riemann boundary value problems, who sadly passed away on Thursday 25th February, 2021.
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Dedicated to Professor Boris Aleksandrovich Kats
(Submitted by A. M. Elizarov)
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Bory-Reyes, J. The Homogeneous Riemann Boundary Value Problem with General Continuous Coefficient on Rectifiable Open Curves. Lobachevskii J Math 42, 2926–2935 (2021). https://doi.org/10.1134/S199508022112009X
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DOI: https://doi.org/10.1134/S199508022112009X