Infinitesimal bendings of some classes of rotational surfaces with mixed curvature

Authors

  • Ivanka Ivanova-Karatopraklieva

Abstract

The infinitesimal bendings of first order of three families of rotational surfaces $S_{\lambda}^2$, $S_\lambda^1$ and $S_\lambda^0$ ($\lambda$ is a parameter), with a mixed Gaussian curvature are investigated. The surface $S^2_\lambda$ are doubly connected, $S_\lambda^1$-simly connected, $S_\lambda^0$ - closed, and they haven't any inner asymptotic parallels. The boudary of the surfaces consists of asymptotic parallels and their poles are smooth-nonparabolic or parabolic, or conic points. It is proved that a countable set of nonrigid surfaces exists in $S_\lambda^2(S_\lambda^1,S_\lambda^0)$

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Published

1993-12-12

How to Cite

Ivanova-Karatopraklieva, I. (1993). Infinitesimal bendings of some classes of rotational surfaces with mixed curvature. Ann. Sofia Univ. Fac. Math. And Inf., 85, 89–106. Retrieved from https://stipendii.uni-sofia.bg/index.php/fmi/article/view/458