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On Extensions of Myers' Theorem

Authors:	Li Xue-Mei

Institution:	Mathematics Institute, University of Warwick Coventry CV4 7AL

Abstract:	Let M be a compact Riemannian manifold, and let h be a smoothfunction on M. Let p^h(x) = inf\| ${upsilon}$ \|–₁(Ric_x( ${upsilon}$ , ${upsilon}$ )–2Hess(h_x( ${upsilon}$ , ${upsilon}$ )).Here Ric_x denotes the Ricci curvature at x and Hess(h) is theHessian of h. Then M has finite fundamental group if ${Delta}$ ^h–p^h<0. Here ${Delta}$ ^h =: ${Delta}$ +2L ${nabla}$ _h is the Bismut-Witten Laplacian. This leadsto a quick proof of recent results on extension of Myers' theoremto manifolds with mostly positive curvature. There is also asimilar result for noncompact manifolds.

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