The Rosenberg S1 -Stability Conjecture for χ(X) = 0

Abstract

Let X be a closed, oriented manifold with X ≥slant 5 . In this article, we show that 2006 Rosenberg's S1 -stability holds when X has zero Euler characteristic. The 2006 Rosenberg-Stolz Conjecture for X × R also follows under the same assumption, provided that the Riemannian metric g on X × R is complete, is of bounded curvature, and whose smallest eigenvalue is uniformly bounded below by some positive constant. We then show a Tn -stability theorem with the same hypothesis of X .

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