Helicoidal Minimal Surfaces in a Conformally Flat 3-Space

Araújo, Kellcio O.; Cui, Ningwei; Pina, Romildo

doi:10.4134/bkms.2016.53.2.531

Cited by 8 publications

(2 citation statements)

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“…Proof of (b). As the torsion function f (r) = 2 1−r , r < 1, is not a constant function, we can conclude that H 2 × f R is isometric to neither H 2 × R nor H 3 .…”

Section: Rotational Surfaces With Constant Extrinsic Curvature In Ementioning

confidence: 83%

“…The manifold R 3 endowed with a metric as defined above will be denoted by E 3 F . Helicoidal minimal surfaces and helicoidal surfaces with prescribed extrinsic curvature were studied in E 3 F , for a special conformal factor [2], [11]. As this space is invariant under the actions of the rotational group around x 3 -axis, it is logical to consider rotational surfaces around x 3 -axis, because they are invariant under the action of the same group.…”

Section: Introductionmentioning

confidence: 99%

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Complete surfaces with zero curvatures in conformally flat spaces

Araújo¹,

Corro²,

Pina³

et al. 2020

Publ. Math. Debrecen

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In this paper, we introduce a family of Riemannian manifolds E 3 F , which are Euclidean space R 3 endowed with conformally flat metrics. We characterize rotational surfaces with constant Gaussian and extrinsic curvatures in E 3 F . We present a particular space that is isometric to H 2 × S 1 , and, using a special parametrization, we construct a family of complete rotational surfaces with zero Gaussian and extrinsic curvatures in H 2 × S 1 . We have built a special space that is a warped product H 2 × f R, which is a complete space foliated by complete surfaces of constant Gaussian curvature −1; this shows that the hyperbolic space H 2 is isometrically immersed into the space H 2 × f R, and this space is isometric to neither H 3 nor H 2 × R, showing that in the ambient space, H 2 × f R Hilbert theorem does not hold.

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“…Proof of (b). As the torsion function f (r) = 2 1−r , r < 1, is not a constant function, we can conclude that H 2 × f R is isometric to neither H 2 × R nor H 3 .…”

Section: Rotational Surfaces With Constant Extrinsic Curvature In Ementioning

confidence: 83%

Section: Introductionmentioning

confidence: 99%