Remarks on flat S1-bundles, C∞ vs Cω
Abstract
We describe low dimensional homology groups of Diffδ+S1 in terms of Haefliger's classifying space B1 by applying a theorem of Thurston. Then we consider the question whether some power of the rational Euler class vanishes for real analytic flat S1-bundles. We show that if it occurs, then the homology group of Diff+ω,δ S1 should contain two kinds of many torsion classes which vanish in Diffδ+S1. This is an informal note on our discussions about the above question.
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