K-cowaist on complete foliated manifolds
Abstract
Let (M,F) be a connected (not necessarily compact) foliated manifold carrying a complete Riemannian metric gTM. We generalize Gromov's K-cowaist using the coverings of M, as well as defining a closely related concept called the A-cowaist. Let kF be the associated leafwise scalar curvature of gF = gTM|F. We obtain some estimates on kF using these two concepts. In particular, assuming that the generalized K-cowaist is infinity and either TM or F is spin, we show that ∈f(kF)≤ 0.
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