Abstract
Some theorems concerning the compact classes of homeomorphisms with hydrodynamic normalization, which are solutions of the Beltrami equation and the characteristics of which are compactly supported and satisfy certain constraints of the theoretical-set type, have been proved. As a consequence, we obtained results on the compact classes of solutions of the corresponding Dirichlet problems considered in a certain Jordan domain.
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References
V. Ya. Gutlyanskii and V. I. Ryazanov, The Geometric and Topological Theory of Functions and Mappings [in Russian], Kiev, Naukova Dumka, 2011.
V. Gutlyanskii, V. Ryazanov, U. Srebro, and E. Yakubov, The Beltrami Equation: A Geometric Approach, Springer, New York, 2012.
V. Ya. Gutlyanskii and V. I. Ryazanov. Infinitesimal Geometry of Spatial Mappings, Akademperiodyka, Kiev, 2013.
V. Ya. Gutlyanskii, V. I. Ryazanov, and E. Yakubov. “The Beltrami equations and prime ends,” Ukr. Math. Bull., 12(1), 27–66 (2015); transl. in J. Math. Sci., 210(1), 22–51 (2015).
Yu. P. Dybov. “Compactness of classes of the solutions of the Dirichlet problem for the Beltrami equations,” Trudy IPMM NAS Ukrainy, 19, 81–89 (2009).
Yu. P. Dybov. “On regular solutions of the Dirichlet problem for the Beltrami equations,” Complex Variables and Elliptic Equations, 55(12), 1099–1116 (2010).
T. Lomako. “On the theory of convergence and compactness for Beltrami equations with constraints of set-theoretic type,” Ukrainian Mathematical Journal, 63(9), 1400–1414 (2012).
J. Väisälä. Lectures on n-Dimensional Quasiconformal Mappings. Lecture Notes in Math., 229, Springer–Verlag, Berlin etc, 1971.
V. Ryazanov, U. Srebro, and E. Yakubov. “Finite mean oscillation and the Beltrami equation,” Israel Math. J., 153, 247–266 (2006).
V. Ryazanov, R. Salimov, and E. Sevost’yanov. “On Convergence Analysis of Space Homeomorphisms,” Siberian Advances in Mathematics, 23(4), 263–293 (2013).
F. W. Gehring and O. Martio. “Quasiextremal distance domains and extension of quasiconformal mappings,” J. d’Anal. Math., 24, 181–206 (1985).
E. A. Sevost’yanov. “Equicontinuity of homeomorphisms with unbounded characteristic,” Siberian Advances in Mathematics, 23(2), 106–122 (2013).
T. Lomako, R. Salimov, and E. Sevost’yanov. “On equicontinuity of solutions to the Beltrami equations,” Ann. Univ. Bucharest (math. series), V. LIX(2), 261–271 (2010).
O. Martio, V. Ryazanov, U. Srebro, and E. Yakubov. Moduli in Modern Mapping Theory. Springer Science + Business Media, New York LLC, 2009.
G. M. Goluzin. Geometric Theory of Complex-Variable Functions [in Russian], Fizmatgiz, Moscow, 1966.
V. Ryazanov, U. Srebro, and E. Yakubov. “On convergence theory for Beltrami equations,” Ukr. Math. Bull., 5(4), 517–528 (2008).
S. Hencl and P. Koskela. “Regularity of the inverse of a planar Sobolev homeomorphism,” Arch. Ration. Mech. and Anal., 180(1), 75–95 (2006).
S. P. Ponomarev. “N -1-property of mappings and Luzin’s condition (N),” Matematicheskie Zametki, 58, 411–418 (1995).
J. Maly and O. Martio. “Lusin’s condition N and mappings of the class \( {W}_{loc}^{1,n} \) ,” J. Reine Angew. Math., 458, 19–36 (1995).
H. Federer. Geometric Measure Theory. Springer-Verlag, Berlin, 1996.
L. V. Ahlfors. Lectures on Quasiconformal Mappings, D. Van Nosrtrand, Princeton, NJ, 1969.
Yu. G. Reshetnyak, Spatial Nappings with Limited Distortion [in Russian], Nauka, Novosibirsk, 1982.
O. Lehto and K. Virtanen. Quasiconformal Mappings in the Plane, Springer, New York etc., 1973.
E. O. Sevost’yanov, S. O. Skvortsov, and O. P. Dovgopyatyi, “On nonhomeomorphic mappings with the inverse Poletsky inequality,” Ukr. Mat. Bull., 17(3), 414–436 (2020); transl. in J. Math. Sci., 252(4), 541–557 (2021).
S. Stoilov, Lectures on Topological Principles of the Theory of Analytic Functions [in Russian], Nauka, Moscow, 1964.
E. A. Sevost’yanov. “Analog of the Montel theorem for mappings of the Sobolev class with finite distortion,” Ukrainian Mathematical Journal, 67(6), 938–947 (2015).
D. A. Kovtonyuk, I. V. Petkov, V. I. Ryazanov, and R. R. Salimov, “The boundary behavior and the Dirichlet problem for the Beltrami equations,” Algebra i Analiz, 25(4), 101–124 (2013); transl. in St. Petersburg Math. J., 25(4), 587–603 (2013).
A. Hurwitz and R. Courant, Funktionentheorie, Springer, Berlin, 1966.
V. I. Ryazanov, “On the accuracy of some convergence theorems,” Doklady Akademii Nauk SSSR, 315(2), 317–319 (1990).
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Translated from Ukrains’kiĭ Matematychnyĭ Visnyk, Vol. 18, No. 3, pp. 319–337, July–September, 2021.
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Dovhopiatyi, O.P., Sevost’yanov, E.A. On the compactness of classes of the solutions of the Dirichlet problem. J Math Sci 259, 23–36 (2021). https://doi.org/10.1007/s10958-021-05598-7
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DOI: https://doi.org/10.1007/s10958-021-05598-7