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(Reference retrieved automatically from Web of Science through information on FAPESP grant and its corresponding number as mentioned in the publication by the authors.)

Lagrangian immersions in the product of Lorentzian two manifolds

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Author(s):
Georgiou, Nikos [1, 2]
Total Authors: 1
Affiliation:
[1] Univ Sao Paulo, Dept Math & Stat, BR-05508090 Sao Paulo, SP - Brazil
[2] Univ Fed Sao Carlos, Dept Math, BR-13565905 Sao Carlos - Brazil
Total Affiliations: 2
Document type: Journal article
Source: Geometriae Dedicata; v. 178, n. 1, p. 1-13, OCT 2015.
Web of Science Citations: 0
Abstract

For Lorentzian two manifolds and we consider the two product para-Kahler structures defined on the product four manifold , with . We show that the metric is locally conformally flat (resp. Einstein) if and only if the Gauss curvatures of , respectively, are both constants satisfying (resp. ). We give the conditions on the Gauss curvatures for which every Lagrangian surface with parallel mean curvature vector is the product , where and are geodesics. We study Lagrangian surfaces in the product with parallel mean curvature vector and finally, we explore the stability and Hamiltonian stability of certain minimal Lagrangian surfaces and -minimal surfaces. (AU)

FAPESP's process: 10/08669-9 - Normal Congruences and Lagrangian submanifolds in spaces of geodesics
Grantee:Nikos Georgiou
Support Opportunities: Scholarships in Brazil - Post-Doctoral