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On the first eigenvalue of the Laplace operator for compact spacelike submanifolds in Lorentz–Minkowski spacetime 𝕃m

Published online by Cambridge University Press:  11 February 2021

Francisco J. Palomo
Affiliation:
Departamento de MatemĂĄtica Aplicada, Universidad de MĂĄlaga, 29071MĂĄlaga, Spain ([email protected])
Alfonso Romero
Affiliation:
Departamento de GeometrĂ­a y TopologĂ­a, Universidad de Granada, 18071Granada, Spain ([email protected])

Abstract

By means of a counter-example, we show that the Reilly theorem for the upper bound of the first non-trivial eigenvalue of the Laplace operator of a compact submanifold of Euclidean space (Reilly, 1977, Comment. Mat. Helvetici, 52, 525–533) does not work for a (codimension â©Ÿ2) compact spacelike submanifold of Lorentz–Minkowski spacetime. In the search of an alternative result, it should be noted that the original technique in (Reilly, 1977, Comment. Mat. Helvetici, 52, 525–533) is not applicable for a compact spacelike submanifold of Lorentz–Minkowski spacetime. In this paper, a new technique, based on an integral formula on a compact spacelike section of the light cone in Lorentz–Minkowski spacetime is developed. The technique is genuine in our setting, that is, it cannot be extended to another semi-Euclidean spaces of higher index. As a consequence, a family of upper bounds for the first eigenvalue of the Laplace operator of a compact spacelike submanifold of Lorentz–Minkowski spacetime is obtained. The equality for one of these inequalities is geometrically characterized. Indeed, the eigenvalue achieves one of these upper bounds if and only if the compact spacelike submanifold lies minimally in a hypersphere of certain spacelike hyperplane. On the way, the Reilly original result is reproved if a compact submanifold of a Euclidean space is naturally seen as a compact spacelike submanifold of Lorentz–Minkowski spacetime through a spacelike hyperplane.

Type
Research Article
Copyright
Copyright © The Author(s), 2021. Published by Cambridge University Press on behalf of The Royal Society of Edinburgh

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References

Alías, L. J., Estudillo, F. J. M. and Romero, A.. Spacelike submanifolds with parallel mean curvature in pseudo-Riemannian space forms. Tsukuba J. Math. 21 (1997), 169–179.CrossRefGoogle Scholar
Berger, M., Gauduchon, P. and Mazet, E.. Le spectre d'une variété Riemannienne. Lectures Notes in Mathematics, vol. 194 (Berlin-New York: Springer-Verlag, 1971).CrossRefGoogle Scholar
Bleecker, D. D. and Weiner, J. L.. Extrinsic bounds on λ1 of Δ on a compact manifold. Comment. Mat. Helvetici 51 (1976), 601–609.CrossRefGoogle Scholar
Chavel, I.. Eigenvalues in Riemannian Geometry. Pure and Applied Math, vol. 115 (Orlando, FL: Academic Press, 1984).Google Scholar
Chavel, I.. Riemannian Geometry. A modern Introduction, Second Edition. Cambridge Studies in Advances Mathematics, vol. 98 (Cambridge: Cambridge University Press, 2006).CrossRefGoogle Scholar
El Soufi, A. and Ilias, S.. Une inĂ©galitĂ© du type ‘Reilly’ pour les sousvariĂ©tĂ©s de l'espace hyperbolique. Comment. Mat. Helvetici 67 (1992), 167–181.CrossRefGoogle Scholar
GutiĂ©rrez, M., Palomo, F. J. and Romero, A.. A Berger–Green type inequality for compact Lorentzian manifolds. Trans. Am. Math. Soc. 354 (2002), 4505–4523.CrossRefGoogle Scholar
Harris, S. G.. A characterization of Robertson-Walker spaces by null sectional curvature. Gen. Relativ. Gravitation 17 (1985), 493–498.CrossRefGoogle Scholar
Heintze, E.. Extrinsic upper bound for λ1. Math. Ann. 280 (1988), 389–402.CrossRefGoogle Scholar
Hersch, J.. Quatre propriĂ©tĂ©s isoperimĂ©triques de membranes sphĂ©riques homogeĂšs. C. R. Acad. Sci. Paris Sr. A 270 (1970), 1645–1648.Google Scholar
Ishihara, T.. Maximal spacelike submanifolds of a pseudo-Riemannian space of constant curvature. Michigan Math. J. 35 (1988), 345–352.CrossRefGoogle Scholar
Kossowski, M.. The total split curvatures of knotted space-like 2-spheres in Minkowski 4-space. Proc. Am. Math. Soc. 117 (1993), 813–818.Google Scholar
Markvorsen, S.. A characteristic eigenfunction for minimal hypersurfaces in spaceforms. Math. Z. 202 (1989), 375–382.CrossRefGoogle Scholar
Palmas, O., Palomo, F. J. and Romero, A.. On the total mean curvature of a compact space-like submanifold in Lorentz–Minkowski spacetime. P. R. Soc. Edinb. A Mat. 148A (2018), 199–210.CrossRefGoogle Scholar
Palomo, F. J. and Romero, A.. On spacelike surfaces in 4-dimensional Lorentz–Minkowski spacetime through a lightcone. P. R. Soc. Edinb. A Mat. 143A (2013), 881–892.CrossRefGoogle Scholar
Reilly, R. C.. On the first eigenvalue of the Laplace operator for compact submanifolds of Euclidean space. Comment. Mat. Helvetici 52 (1977), 525–533.CrossRefGoogle Scholar
Takahashi, T.. Minimal immersions of Riemannian manifolds. J. Math. Soc. Japan 18 (1966), 380–385.CrossRefGoogle Scholar
Treibergs, A. E.. Entire spacelike hypersurfaces of constant mean curvature in Minkowski space. Invent. Math. 66 (1982), 39–56.CrossRefGoogle Scholar