Deformaciones isométricas infinitesimales de una clase de superficies pegadas
In this work the sufficient condition of rigidity of a stuck 4-dimensional surface inthe Euclidean 6-dimensional space is demonstrated. This surface represents in himself,the product of Riemann of two surfaces, each one of which it is in the Euclidean 3-dimensional space and one of them is a stuck s...
Main Author: | Trejos, Olman |
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Format: | Artículo |
Language: | Español |
Published: |
2015
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Online Access: |
http://revistas.ucr.ac.cr/index.php/matematica/article/view/265 http://hdl.handle.net/10669/12912 |
Summary: |
In this work the sufficient condition of rigidity of a stuck 4-dimensional surface inthe Euclidean 6-dimensional space is demonstrated. This surface represents in himself,the product of Riemann of two surfaces, each one of which it is in the Euclidean 3-dimensional space and one of them is a stuck surfaceKeywords: Riemann product, stuck surface, infinitesimal condition of juxtaposition, toreper, to coreper, variety, subvariety, difeomorfism, deformations, isometric deformation,infinitesimal isometric deformation, field of infinitesimal deformations. |
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