Generalized Newton transformation and its applications to extrinsic geometry

Andrzejewski, K.; Kozłowski, Wojciech; Niedziałomski, Kamil

doi:10.4310/ajm.2016.v20.n2.a4

Cited by 9 publications

(13 citation statements)

References 25 publications

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“…Moreover, T r are also self-adjoint and commutes with A W . Furthermore, the following algebraic properties of T r are well-known (see [1], [12] and references therein for details).…”

Section: Newton Transformations Of a Wmentioning

confidence: 99%

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On total mean curvatures of foliated half-lightlike submanifolds in semi-Riemannian manifolds

Massamba

Ssekajja

2020

Hacettepe Journal of Mathematics and Statistics

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We derive total mean curvature integration formulae of a three co-dimensional foliation F n on a screen integrable half-lightlike submanifold, M n+1 in a semi-Riemannian manifold M n+3 . We give generalized differential equations relating to mean curvatures of a totally umbilical half-lightlike submanifold admitting a totally umbilical screen distribution, and show that they are generalizations of those given by [4].2010 Mathematics Subject Classification. Primary 53C25; Secondary 53C40, 53C50. Key words and phrases. Half-lightlike submanifolds; Newton transformation, foliation and mean curvature. FORTUNÉ MASSAMBA, SAMUEL SSEKAJJAProof. Replacing X with E in the Proposition 5.1 and then using (2.16) and (5.2) we obtain, for all r = 0, 1, · · · , n,from which the result follows by applying (5.4) and (5.5).Corollary 5.3. Under the hypothesis of Theorem 5.2, the induced connection ∇ on M is a metric connection, if and only if, the r-th mean curvature S r with respect to A N are solution of the following equationAlso the following holds. Corollary 5.4. Under the hypothesis of Theorem 5.2, M (c) is a semi-Euclidean space, if and only if, the r-th mean curvature S r with respect to A N are solution of the following equation E(S r+1 ) − τ (E)(r + 1)S r+1 = H 1 (r + 1)S r+1 .

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“…Moreover, T r are also self-adjoint and commutes with A W . Furthermore, the following algebraic properties of T r are well-known (see [1], [12] and references therein for details).…”

Section: Newton Transformations Of a Wmentioning

confidence: 99%

“…This is partly due to the non-linearity of S r for r > 1, and hence very complicated to study. A great deal of research on higher order mean curvatures S r in Riemannian geometry has been done with numerous applications, for instance see [1] and [12]. This gap has motivated our introduction of lightlike geometry of S r for r > 1.…”

Section: Introductionmentioning

confidence: 99%

On total mean curvatures of foliated half-lightlike submanifolds in semi-Riemannian manifolds

Massamba

Ssekajja

2020

Hacettepe Journal of Mathematics and Statistics

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“…It is easy to see that the tensor T * r is unique if and only if the null hypersurface M is totally geodesic. For more details on Newton transformations and their properties, we refer the reader to [2], [15] and many more references therein.…”

Section: Newton Transformations Of a * Ementioning

confidence: 99%

“…Then, the following algebraic properties of T * r are well-known (see [1], [2], [15] and references therein for details). In line with (3.12), we can see that the SAC half-lightlike submanifold given in Example 2.1 is r-minimal with 1 ≤ r ≤ 6.…”

Section: Newton Transformations Of a * Ementioning

confidence: 99%

Higher order mean curvatures of SAC half-lightlike submanifolds of indefinite almost contact manifolds

Massamba¹,

Ssekajja²

2019

Rev. Un. Mat. Argentina

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We introduce higher order mean curvatures of screen almost conformal (SAC) half-lightlike submanifolds of indefinite almost contact manifolds, admitting a semi-symmetric non-metric connection, and use them to generalize some known results of [6]. Also, we derive a new set of integration formulae via the divergence of some special vector fields tangent to this submanifold. Several examples are also included to illustrate the main concepts.2010 Mathematics Subject Classification. Primary 53C25; Secondary 53C40, 53C50.

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“…where (T u ) u stands for the family of the generalized Newton transformations introduced in [4] associated to the matrix A = (A 1 , ..., A q ); (A α ) α∈{1,...,q} is a system of matrices of the shape operators corresponding to a normal basis to the manifold M n andσ u =σ u (A 1 | Σ , ..., A q | Σ ) are the coefficients of the Newton polynomial P A : R q −→ R defined by…”

Section: Introductionmentioning

confidence: 99%

Geometric configuration of Riemannian submanifolds of arbitrary codimension

2017

Self Cite

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In this paper we study a geometric configuration of submanifolds of arbitrary codimension in an ambient Riemannian space. We obtain relations between the geometry of a q-codimension submanifold M n along its boundary and the geometry of the boundary Σ n−1 of M n as an hypersuface of a q-codimensional submanifold P n in an ambient space M n+q . As a consequence of these geometric ralations we get that the ellipticity of the generalized Newton transformations implies the tranversality of M n and P n in P n is totally geodesic in M n+q .

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Generalized Newton transformation and its applications to extrinsic geometry

Cited by 9 publications

References 25 publications

On total mean curvatures of foliated half-lightlike submanifolds in semi-Riemannian manifolds

On total mean curvatures of foliated half-lightlike submanifolds in semi-Riemannian manifolds

Higher order mean curvatures of SAC half-lightlike submanifolds of indefinite almost contact manifolds

Geometric configuration of Riemannian submanifolds of arbitrary codimension

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