Séminaire Algèbre Géométrie Algébrique Topologie Algébrique :

Le 01 février 2024 à 10:00 - salle 430


Présentée par Kitano Teruaki - Soka University

On the Euler class for flat S^1-bundles, C^\infty vs C^\omega



We describe low dimensional homology groups of the real analytic, orientation preserving diffeomorphism group of S^1 in terms of BΓ^1 by applying a theorem of Thurston. It is an open problem whether some power of the rational Euler class vanishes for real analytic flat S^1 bundles. In this talk we discuss that if it does, then the homology group should contain many torsion classes that vanish in the smooth case. Along this line we can give a new proof for the non-triviality of any power of the rational Euler class in the smooth case. If time permits, we will mention some attempts to study a Mather-Thurston map in the analytic case. This talk will be based on a joint work with Shigeyuki Morita and Yoshihiko Mitsuma



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