On quasimorphisms and distortion in homeomorphism groups
Abstract
Let M be a smooth compact oriented connected manifold, and Homeo0(M,μ) the group of homeomorphisms of M supported away from ∂ M, which preserve a Borel probability measure μ induced by a volume form on M, and are isotopic to the identity. In this paper, we identify those Gambaudo-Ghys and Polterovich quasimorphisms Diff0(M,μ) R which extend C0-continuously to Homeo0(M,μ) as quasimorphisms, and to Homeo0(M) as group cochains whose differentials are semi-bounded cocycles. We present several applications of this result which include unboundedness of certain bi-invariant metric on the commutator subgroup of Homeo0(M,μ), and conditions under which a homeomorphism in Homeo0(M) is undistorted.
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