We classify real hypersurfaces in complex projective spaces whose structure Jacobi operator is Lie parallel in

Real Hypersurfaces in Complex Projective Space Whose Structure Jacobi Operator is Lie D -parallel

https://msp.org/pjm/2019/302-1/pjm-v302-n1-p11-s.pdf

Cyclic η-parallel shape and Ricci operators on real hypersurfaces in two-dimensional nonflat complex space forms

This paper is part of the work produced during the first author’s visit at the IEMath-Granada
and supported by it. The second author is supported by grant Proj. No. NRF-2011-220-C0002 from National
Research Foundation of Korea and by MCT-FEDER Grant MTM2010-18099.

Commuting Conditions of the k-th Cho operator with the structure Jacobi operator of real hypersurfaces in complex space forms

Kaimakamis and Panagiotidou in \cite{KP} introduced the notion of $^*$-Ricci soliton and studied the real hypersurfaces of a non-flat complex space form admitting a $^*$-Ricci soliton whose potential vector field is the structure vector field. In this article, we consider that a real hypersurface of a non-flat complex space form admits a $^*$-Ricci soliton whose potential vector field belongs to the principal curvature space and the holomorphic distribution.

Real hypersurfaces with $^{*}$-Ricci solitons of non-flat complex space forms

In this paper we classify the real hypersurfaces in a non-flat complex space form with its structure Jacobi operator R
 ξ
 satisfying (∇
 X
 R
 ξ
 )ξ = 0, for all vector fields X in the maximal holomorphic distribution D. With this result, we prove the non-existence of real hypersurfaces with D-parallel as well as D-recurrent structure Jacobi operator in complex projective and hyperbolic spaces. We can also prove the non-existence of real hypersurfaces with recurrent structure Jacobi operator in a non-flat complex space form as a corollary.

Real hypersurfaces in a complex space form with a condition on the structure Jacobi operator

We prove the non-existence of real hypersurfaces in CP^2 and CH^2 whose structure Jacobi operator is Lie D-parallel

Real Hypersurfaces in CP^2 AND CH^2 whose structure Jacobi operator is Lie D-parallel

In [3], [7] and [8] results concerning the parallelness of the Lie derivative of the structure Jacobi operator of a real hypersurface with respect to and to any vector field X were obtained in both complex projective space and complex hyperbolic space. In the present paper, we study the parallelness of the Lie derivative of the structure Jacobi operator of a real hypersurface with respect to vector field X ∈ D in CP2 and CH2. More precisely, we prove that such real hypersurfaces do not exist.

/pdf/real-hypersurfaces-in-cp-2-and-ch-2-whose-structure-jacobi-3ryno06j9q.pdf

Real hypersurfaces in CP 2 and CH 2 whose structure Jacobi operator is Lie D-parallel

The aim of the present paper is to prove the nonexistence of real hypersurfaces with ${\mathbb{D}}$ -recurrent structure Jacobi operator, in non-flat complex planes. Our results complement work of several other authors who worked in ${\mathbb{C}P^{n}}$ and ${\mathbb{C}H^{n}}$ for n ≥ 3.

Non-existence of real hypersurfaces equipped with recurrent structure Jacobi operator in nonflat complex planes

We study three dimensional real hypersurfaces in CP^2 and CH^2 equipped with $xi$-parallel structure Jacobi operator. We prove that they are Hopf hypersurfaces and if additional $\alpha\neq0$, we classify them.

Real Hypersurfaces Equipped with $xi$-parallel Structure Jacobi Operator in CP^2 or CH^2

The aim of the present paper is the study of some classes of real hypersurfaces equipped with the condition \phi l = l \phi, (l = R(., \xi, \xi))

Real hypersurfaces of non--flat complex space forms in terms of the Jacobi structure operator

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