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Le second nombre de Betti d’une variété riemannienne \((\frac{1}{4}-\epsilon)\)-pincée de dimension 4. (French) Zbl 0486.53033


MSC:

53C20 Global Riemannian geometry, including pinching
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References:

[1] [0] , A unique continuation theorem for solutions of elliptic partial differential equations or inequalities of second order, J. Math. Pure et Appl., 35 (1957), 235-249. · Zbl 0084.30402
[2] [1] , Sur quelques variétés riemanniennes suffisamment pincées, Bull. Soc. Math. de France, 88 (1960), 57. · Zbl 0096.15503
[3] [2] Géométrie riemannienne en dimension 4, Séminaire Arthur Besse, Cedic-Nathan, Paris, 1981. · Zbl 0472.00010
[4] [3] , Riemannian symmetric spaces of rank one, Lecture notes n° 5, M. Dekker. Inc., New-York, 1972. · Zbl 0239.53032
[5] [4] , Inégalités isopérimétriques sur les variétés riemanniennes compactes sans bord (à paraître). · Zbl 0674.53001
[6] [5] , Majoration du second nombre de Betti d’une variété riemannienne (1/4 - ε) - pincée, C.R.A.S., Paris, t. 295 (Sept. 1982), Série I. · Zbl 0497.53045
[7] [6] , Constantes explicites pour les inégalités de Sobolev sur les variétés riemanniennes compactes, Ann. Inst. Fourier, Grenoble, 33, 2 (1983). · Zbl 0528.53040
[8] [7] , A short proof of Berger’s curvature tensor estimates, Proc. of A.M.S., Vol. 26, n° 4 (Déc. 1970), 642. · Zbl 0203.54501
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