Rigidity of non-negatively curved metrics on open five-dimensional manifolds

Abstract

As the first step in the direction of the Hopf conjecture on the non-existence of metrics with positive sectional curvature on S2 × S2 D.Gromoll and K.Tapp in [GT] suggested the following (Weak Hopf) conjecture (on the rigidity of non-negatively curved metrics on S2 × R3): "The boundary S2× S2 of the S2 × B3⊂ S2 × R3 with an arbitrary complete metric of non-negative sectional curvature contains a point where a curvature of S2 × S2 vanish". In this note we verify this.

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