Abstract:
The boundary behaviour of classes of ring mappings, which generalize quasiconformal mappings in the sense of Gehring, is under investigation. Theorems proving that they have continuous boundary extensions are established in terms of prime ends of regular domains. Results on the equicontinuity of mappings in these classes in the closure of a fixed domain are also established in these terms.
Bibliography: 45 titles.
Keywords:
Riemannian manifold, moduli of families of curves and surfaces, end, mapping with bounded distortion, mapping with finite distortion, Orlicz-Sobolev class.
The research of D. P. Ilyutko was carried out with the support of the Russian Foundation of Basic Research (grant no. 19-01-00775-a), and also in the framework of the Programme of State Support of Scientific Schools of the President of the Russian Federation (grant no. НШ-6399.2018.1).
Citation:
D. P. Ilyutko, E. A. Sevost'yanov, “Boundary behaviour of open discrete mappings on Riemannian manifolds. II”, Sb. Math., 211:4 (2020), 539–582
This publication is cited in the following 4 articles:
M. Cristea, “On the radial limits of mappings on Riemannian manifolds”, Anal. Math. Phys., 13:4 (2023), 60
N. S. Ilkevych, E. A. Sevost’yanov, “On Equicontinuity of the Families of Mappings with One Normalization Condition in Terms of Prime Ends”, Ukr. Math. J., 74:6 (2022), 936–945
E. Sevost'yanov, O. P. Dovhopiatyi, N. S. Ilkevych, V. P. Kalenska, “On equicontinuity of families of mappings between Riemannian surfaces with respect to prime ends”, Mat. Stud., 57:2 (2022), 157–171
E. E. Sevost'yanov, “On mappings with the inverse Poletsky inequality on Riemannian manifolds”, Acta Math. Hungar., 167 (2022), 576–611
Citation in format AMSBIB
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