Biology and Medicine.
AstonJournals.
Vol. 8.
2016.
On admissible changes of variables for Sobolev functions on (sub)Riemannian manifolds
We give a description of metric properties of measurable mappings of domains on Riemannian manifolds inducing isomorphisms of Sobolev spaces by the composition rule. We prove that any such mapping can be redefined on a set of measure zero to be quasi-isometric, when the exponent of summability is different from the dimension of a Riemannian manifold or to coincide with a quasi-conformal mapping otherwise. © 2016, Pleiades Publishing, Ltd.
Authors
Vodopyanov S.K.
1,
2,
3
Journal
Number of issue
3
Language
English
Pages
318-321
Status
Published
Link
Volume
93
Year
2016
Organizations
- 1 Sobolev Institute of Mathematics, Siberian Branch, Russian Academy of Sciences, pr. Akademika Koptyuga 4, Novosibirsk, 630090, Russian Federation
- 2 Novosibirsk State University, ul. Pirogova 2, Novosibirsk, 630090, Russian Federation
- 3 Peoples’ Friendship University of Russia, ul. Miklukho-Maklaya 6, Moscow, 117198, Russian Federation
Date of creation
19.10.2018
Date of change
19.10.2018
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Other records
Glass and Ceramics (English translation of Steklo i Keramika).
Springer New York LLC.
Vol. 73.
2016.
P. 47-52