Nonnegative Scalar Curvature and Area Decreasing Maps
Abstract
Let (M,gTM) be a noncompact complete spin Riemannian manifold of even dimension n, with kTM denote the associated scalar curvature. Let f M→ Sn(1) be a smooth area decreasing map, which is locally constant near infinity and of nonzero degree. We show that if kTM≥ n(n-1) on the support of df, then ∈f (kTM)< 0. This answers a question of Gromov. We use a simple deformation of the Dirac operator to prove the result. The odd dimensional analogue is also presented.
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