Mean curvature of a surface in an n-dimensional space. I

This is a preview of subscription content, log in via an institution to check access.

Access this article

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

L. Santalo, Integral Geometry and Geometric Probability [Russian translation], Moscow (1983).
H. Hadwiger, Lectures on Volume, Surface Area, and Isoperimetry [Russian translation], Nauka, Moscow (1966).
Google Scholar
A. D. Aleksandrov and V. A. Zalgaller, “Two-dimensional manifolds of bounded curvature,” Tr. Mosk. Inst. Akad. Nauk SSSR,58, 25–37 (1962).
Google Scholar
I. A. Danelich, “Integral representation of the absoute mean integral curvature of a polyhedral surface and its consequences,” Sib. Mat. Zh.,7, No. 4, 10–26 (1966).
Google Scholar
V. A. Dolzhenkov, “Integral representation of the absolute mean integral curvature of a surface in a three-dimensional Lobachevski space,” in: Problems of Methodology and Mathematical Theory [in Russian], Kursk (1971), pp. 58–80.
Sh. Kobayasi and K. Nomidzu, Foundations of Differential Geometry, Interscience Publishers, New York (1969), Vol. 2.
Google Scholar
I. A. Danelich, “Frechet surfaces of bounded absolute mean integral curvature,” Sib. Mat. Zh.,14, No. 3, 498–524 (1973).
Google Scholar

Authors

V. A. Dolzhenkov
View author publications
You can also search for this author in PubMed Google Scholar

Translated from Ukrainskii Geometricheskii Sbornik, No. 32, pp. 39–47, 1989.

Dolzhenkov, V.A. Mean curvature of a surface in an n-dimensional space. I. J Math Sci 59, 717–724 (1992). https://doi.org/10.1007/BF01097169

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.