Zorich's theorem
Appearance
In mathematical analysis, Zorich's theorem was proved by Vladimir A. Zorich in 1967.[1] The result was conjectured by M. A. Lavrentev in 1938.[2]
Theorem
[edit]Every locally homeomorphic quasiregular mapping for , is a homeomorphism of .[3]
The fact that there is no such result for is easily shown using the exponential function.[4]
References
[edit]- ^ Zorič, V. A. (1967). "Homeomorphism of quasiconformal space maps". Proceedings of the USSR Academy of Sciences. 176: 31–34. MR 0223568. As cited by Zorich (1992)
- ^ Lavrentieff, M. (1938). "Sur un critère différentiel des transformations homéomorphes des domaines à trois dimensions". Proceedings of the USSR Academy of Sciences. 20: 241–242. As cited by Zorich (1992)
- ^ Zorich, Vladimir A. (1992). "The global homeomorphism theorem for space quasiconformal mappings, its development and related open problems". In Vuorinen, Matti (ed.). Quasiconformal Space Mappings: A collection of surveys 1960-1990. Germany: Springer-Verlag. pp. 132–148. doi:10.1007/BFB0094243. ISBN 3-540-55418-1. LCCN 92012192. OCLC 25675026. S2CID 116148715. Retrieved February 10, 2024.
- ^ Zorich (1992), p. 135.