Enlargeable foliations and the monodromy groupoid

Abstract

Let M be a spin manifold, the Dirac operator with coefficient in the universal flat Hilbert C π1(M)-module determines a "Rosenberg index element" which, according to B.Hanke and T.Schick, subsumes the enlargeablility obstruction of positive scalar curvature on M. In this note, we generalize this result to the case of spin foliation. More precisely, given a foliation (M,F) with F spin, we shall define a foliation version of "Rosenberg index element" and prove that it is nonzero at the presence of compactly enlargeability of (M,F).

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