2010
DOI: 10.2478/s11533-010-0073-9
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Invariants and Bonnet-type theorem for surfaces in ℝ4

Abstract: In the tangent plane at any point of a surface in the four-dimensional Euclidean space we consider an invariant linear map ofWeingarten-type and find a geometrically determined moving frame field. Writing derivative formulas of Frenet-type for this frame field, we obtain eight invariant functions. We prove a fundamental theorem of Bonnet-type, stating that these eight invariants under some natural conditions determine the surface up to a motion. We show that the basic geometric classes of surfaces in the four-… Show more

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Cited by 27 publications
(125 citation statements)
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“…In Section 3 we proved that any timelike surface with H = 0 free of flat points is determined up to a motion in R 4 1 by two invariant functions µ and ν satisfying a system of two partial differential equations, namely system (9).…”
Section: Resultsmentioning
confidence: 99%
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“…In Section 3 we proved that any timelike surface with H = 0 free of flat points is determined up to a motion in R 4 1 by two invariant functions µ and ν satisfying a system of two partial differential equations, namely system (9).…”
Section: Resultsmentioning
confidence: 99%
“…Using that x(u, v) and y(u, v) satisfy (10) we get that the integrability conditions z uv = z vu of system (14) The meaning of Theorem 3.5 is that any timelike surface with H = 0 free of flat points is determined up to a motion in R 4 1 by two invariant functions satisfying the system of natural partial differential equations (9).…”
Section: Fundamental Theorem For Timelike Surfaces With Zero Mean Curmentioning
confidence: 99%
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