Boundedness of bundle diffeomorphism groups over a circle

Abstract

In this paper we study boundedness of bundle diffeomorphism groups over a circle. For a fiber bundle π : M S1 with fiber N and structure group and r ∈ Z≥ 0 \ ∞ \ we distinguish an integer k = k(π, r) ∈ Z≥ 0 and construct a function : Diffπ(M)0 Rk. When k ≥ 1, it is shown that the bundle diffeomorphism group Diffπ(M)0 is uniformly perfect and clbπ\, Diffrπ(M)0 ≤ k+3, if Diff, c(E)0 is perfect for the trivial fiber bundle : E R with fiber N and structure group . On the other hand, when k = 0, it is shown that is a unbounded quasimorphism, so that Diffπ(M)0 is unbounded and not uniformly perfect. We also describe the integer k in term of the attaching map φ for a mapping torus π : Mφ S1 and give some explicit examples of (un)bounded groups.