On the prescribed scalar curvature problem on Sn: The degree zero case

On the prescribed scalar curvature problem on Sn: The degree zero case

In this Note, we consider the problem of the existence of conformal metrics with prescribed scalar curvature on the standard sphere Sn, n⩾3. We give new existence and multiplicity results based on a new Euler–Hopf formula type. Our argument also has the advantage of extending the well known results...

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Veröffentlicht in:Comptes rendus. Mathématique 2012-06, Vol.350 (11-12), p.583-586
Hauptverfasser: Ben Mahmoud, Randa, Chtioui, Hichem, Rigane, Afef
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Commutative rings and algebras
Exact sciences and technology
General mathematics
General, history and biography
Mathematics
Sciences and techniques of general use
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Zusammenfassung:In this Note, we consider the problem of the existence of conformal metrics with prescribed scalar curvature on the standard sphere Sn, n⩾3. We give new existence and multiplicity results based on a new Euler–Hopf formula type. Our argument also has the advantage of extending the well known results due to Y. Li (1995) [10]. Dans cette Note nous considérons le problème dʼexistence de métriques conformes avec courbure scalaire prescrite, sur la sphère standard Sn, n⩾3. Nous donnons de nouveaux résultats dʼexistence et de multiplicité reposant sur un nouveau type de formule dʼEuler–Hopf. Nos arguments ont également lʼavantage dʼétendre des résultats bien connus de Y. Li (1995) [10].
ISSN:1631-073X
1778-3569
DOI:10.1016/j.crma.2012.06.012