Total squared mean curvature of immersed submanifolds in a negatively curved space

Abstract

Let n 2 and k 1 be two integers. Let M be an isometrically immersed closed n-submanifold of co-dimension k that is homotopic to a point in a complete manifold N, where the sectional curvature of N is no more than δ<0. We prove that the total squared mean curvature of M in N and the first non-zero eigenvalue λ1(M) of M satisfies λ1(M) n(δ +1Vol M∫M |H|2 dvol). The equality implies that M is minimally immersed in a metric sphere after lifted to the universal cover of N. This completely settles an open problem raised by E. Heintze in 1988.

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