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Helicoidal surfaces with constant mean curvature
Abstract: We describe the space Σ H of all surfaces in R z that have constant mean curvature HφO and are invariant by helicoidal motions, with a fixed axis, of R Ά . Similar to the case Σ o of minimal surfaces Σ H behaves roughly like a circular cylinder where a certain generator corresponds to the rotation surfaces and each parallel corresponds to a periodic family of isometric helicoidal surfaces.1. Introduction. 1.1. Rotation surfaces in the Euclidean space ϋ! 3 with constant mean curvature have been known for a long…
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Cited by 91 publications
(102 citation statements)
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“…The rotation surfaces in the Euclidean 3-space (Do Carmo and Dajczer, 1982). These classifications were extended to the ones with prescribed mean and Gaussian curvatures by (Baikoussis and Koufogiorgos, 1998) The helicoidal surfaces also have been studied by many authors as focusing on curvature properties in the Minkowskian 3-space …”
mentioning
confidence: 99%
“…The rotation surfaces in the Euclidean 3-space (Do Carmo and Dajczer, 1982). These classifications were extended to the ones with prescribed mean and Gaussian curvatures by (Baikoussis and Koufogiorgos, 1998) The helicoidal surfaces also have been studied by many authors as focusing on curvature properties in the Minkowskian 3-space …”
mentioning
confidence: 99%
“…Hence, we obtain Remark 2. Helicoidal surfaces in E 3 with constant Gaussian curvature were obtained in [13].…”
Section: Helicoidal Surfacesmentioning
confidence: 99%
“…(Use Chapter 4, Volume 3 in Spivak 1979 and the first and second fundamental forms of a helicoidal surface in the natural coordinates as described earlier or as may be found in Baikoussis & Koufogiorgos 1997, 1998, Do Carmo & Dajczer 1982. Therefore, as before for ψ, we have that k g , k n , τ g are all non-zero constants (along each individual helix).…”
Section: B) Tangential Developables Of Circular Helicesmentioning
confidence: 99%
“…We observe that the constant C is the pitch of the helicoidal motion, h in Baikoussis & Koufogiorgos 1997, Do Carmo & Dajczer 1982, Soyuçok 1995 Changing ψ by a constant, for two constant values ψ 1 and ψ 2 of ψ we consider C 1 and C 2 constants satisfying…”
Section: Application To Surfaces Invariant Under a One-parameter Groumentioning
confidence: 99%
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