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dc.contributor.authorPérez Jiménez, Juan De Dios 
dc.contributor.authorPérez López, David
dc.identifier.citationPérez, J.d.D., Pérez-López, D. Lie Derivatives of the Shape Operator of a Real Hypersurface in a Complex Projective Space. Mediterr. J. Math. 18, 207 (2021). []es_ES
dc.descriptionThis work was supported by MINECO-FEDER Project MTM 2016-78807-C2-1-P.es_ES
dc.description.abstractWe consider real hypersurfaces M in complex projective space equipped with both the Levi-Civita and generalized Tanaka–Webster connections. Associated with the generalized Tanaka–Webster connection we can define a differential operator of first order. For any nonnull real number k and any symmetric tensor field of type (1,1) B on M, we can define a tensor field of type (1,2) on M, B(k) T , related to Lie derivative and such a differential operator. We study symmetry and skew symmetry of the tensor A(k) T associated with the shape operator A of M.es_ES
dc.description.sponsorshipMINECO-FEDER Project MTM 2016-78807-C2-1-Pes_ES
dc.rightsAtribución 3.0 España*
dc.subjectkth g-Tanaka–Webster connectiones_ES
dc.subjectComplex projective spacees_ES
dc.subjectReal hypersurfacees_ES
dc.subjectShape operatores_ES
dc.subjectLie derivativeses_ES
dc.titleLie Derivatives of the Shape Operator of a Real Hypersurface in a Complex Projective Spacees_ES

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Atribución 3.0 España
Except where otherwise noted, this item's license is described as Atribución 3.0 España