Vector fields of zero total curvature of the second type in fore-dimension space

Please use this identifier to cite or link to this item: http://earchive.tpu.ru/handle/11683/4292

Title:	Vector fields of zero total curvature of the second type in fore-dimension space
Authors:	Onishchyk, N. М. Narezhneva, D. L.
Keywords:	vector fields; zero total curvature; fore-dimension space; geometry; Euclidean space; linear operators; geometrical properties; Pfaffian variety; non-holonomic variety; classes; nonholonomicity; researches; Cartan's method of exterior forms; moving frames
Issue Date:	2007
Publisher:	Томский политехнический университет
Citation:	Onishchyk N. М. Vector fields of zero total curvature of the second type in fore-dimension space / N. М. Onishchyk, D. L. Narezhneva // Bulletin of the Tomsk Polytechnic University. — 2007. — Vol. 310, № 1. — [P. 37-42].
Abstract:	Geometry of flat vector fields for which total curvature of the second kind equals zero in a domain of four-dimensional Euclidean space has been studied. These vector fields are classified depending on rank of the fundamental linear operator. Geometrical properties of Non-holonomic Pfaffian variety orthogonal to the vector field are investigated for each class. An example of a vector field with constant nonholonomicity vector different from zero is constructed. The research is carried out by the Cartan's method of exterior forms within moving frames.
URI:	http://earchive.tpu.ru/handle/11683/4292
Appears in Collections:	Известия Томского политехнического университета. Инжиниринг георесурсов

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