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Complex Variables and Elliptic Equations
An International Journal
Volume 64, 2019 - Issue 6
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Original Articles

Nonlinear mixed Cherepanov boundary-value problem

Yurii ObnosovInstitute of Mathematics and Mechanics, Kazan Federal University, Kazan, RussiaCorrespondence[email protected]
&
Airat ZulkarnyaevInstitute of Mathematics and Mechanics, Kazan Federal University, Kazan, Russia
Pages 979-996 | Received 27 Oct 2017, Accepted 17 Jun 2018, Published online: 16 Jul 2018

References

  • Riemann B. Grundlagen für eine allgemeine Theorie der Functionen einer veränderlichen complexen Grösse. Göttingen: Verlag von Adalbert Rente; 1867. p. 1–32. German.
  • Gakhov FD. Boundary value problems. New York (NY): Addison Wesley; 1966.
  • Muskhelishvili NI. Singular integral equations. Groningen: Noordhoff; 1972.
  • Guseinov AI, Mukhtarov KS. Introduction to the theory of nonlinear singular integral equations. Moscow: Nauka; 1992. Russian.
  • Shnirel'man AI. The degree of a quasi-ruled mapping and a nonlinear Hilbert problem. Math USSR Sb. 1972;18:373–396. doi: 10.1070/SM1972v018n03ABEH001825
  • Wegert E. Nonlinear boundary value problems for holomorphic functions and singular integral equations. Berlin: Akademie Verlag; 1992.
  • Begehr H, Efendiev MA. On the asymptotics of meromorphic solutions for nonlinear Riemann-Hilbert problems. Math Proc Camb Philos Soc. 1999;127:159–172. doi: 10.1017/S0305004199003539
  • Ĉerne M. Nonlinear Riemann-Hilbert problem for bordered Riemann surfaces. Amer J Math. 2004;126:65–87. doi: 10.1353/ajm.2004.0002
  • Ĉerne M. Nonlinear Riemann-Hilbert problems for quasilinear ∂̄–equations on the unit disc. Complex Var Elliptic Equ. 2018;63(2):278–291. doi: 10.1080/17476933.2017.1304389
  • Efendiev MA, Wendland WL. Nonlinear Riemann-Hilbert problems for generalized analytic functions. Funct Approx Comment Math. 2009;40:185–208. doi: 10.7169/facm/1246454028
  • Glader C, Wegert E. Nonlinear Riemann-Hilbert problems with circular target curves. Math Nachr. 2008;281:1221–1239. doi: 10.1002/mana.200710673
  • Micula S, Wendland WL. Trigonometric collocation for nonlinear Riemann-Hilbert problems on doubly connected domains. IMA J Numer Anal. 2015;35:834–858. doi: 10.1093/imanum/dru009
  • Mityushev VV, Rogosin SV. Constructive methods for linear and nonlinear boundary value problems for analytic functions: theory and applications. Boca Raton (FL): Chapman ‘S’ Hall/CRC; 2002.
  • Obnosov YV. Some nonlinear boundary value problems of the theory of analytic functions, solvable in closed form. In: Scientific Works of the Jubilee Seminar on Boundary Value Questions, Collect. Artic, Minsk: Izdatel'stvo Universitetskoe; 1985. p. 86–95. Russian.
  • Antipov YA, Silvestrov VV. Method of Riemann surfaces in the study of supercavitating flow around two hydrofoils in a channel. Phys D. 2007;235:72–81. doi: 10.1016/j.physd.2007.04.013
  • Antipov YA, Zemlyanova AY. Motion of a yawed supercavitating wedge beneath a free surface. SIAM J Appl Math. 2009;70:923–948. doi: 10.1137/090747300
  • von Wolfersdorf L. Analytic solutions of auto-, cross-, and triple-correlation equations and related integral and integro-differential equations. Sitz.ber. Sc̈hs. Akad. Wiss. Leipz Math-Natwiss. Kl. 2004;129:1–35. German.
  • Cherepanov GP. An elastic–plastic problem under conditions of antiplanar deformation. J App Math Mech. 1962;26:697–708.
  • Cherepanov GP. A nonlinear theory-of-functions boundary problem in some elastoplastic problems. Dokl Akad Nau. 1963;147:566–568.
  • Obnosov YV. Solution of a certain nonlinear mixed boundary value problem of analytic function theory. Soviet Math (Iz VUZ). 1975;19(6):78–83.
  • Obnosov YV. Solution of a Cherepanov's nonlinear mixed boundary value problem on the case n=2. In: Theory of complex variable functions and boundary value problems. Vol. 4. Cheboksary; 1982. p.70–76. Russian.
  • Obnosov YV. On the solution of a nonlinear mixed boundary-value problem in the theory of analytic functions. Proceedings of the International Conference on Complex Analysis and its Applications; 1981 Sept 20–27; Varna. Bulgaria: Publ. House Bulgar. Acad. Sci.; 1984. p. 549–563. Russian.
  • Springer G. Introduction to Riemann surfaces. Providence: American Mathematical Society; 2002. (AMS Chelsea publishing series).
  • Zverovich EI. Boundary value problems in the theory of analytic functions in Hölder classes on Riemann surfaces. Russian Math Surv. 1971;26(1):117–192. doi: 10.1070/RM1971v026n01ABEH003811
  • Antipov YA, Silvestrov VV. Electromagnetic scattering from an anisotropic impedance half-plane at oblique incidence: the exact solution. Quart J Mech Appl Math. 2006;59:211–251. doi: 10.1093/qjmam/hbj004
  • Golubev VV. Lectures on integration of the equations of motion of a rigid body about a fixed point. Moscow: State Pub. House of Theoretical Technical Literature; 1960. Russian.

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