Homeomorphism groups of Hilbert cube manifolds

Suppose M is a noncompact connected PL 2-manifold and let H(M) 0 denote the identity component of the homeomorphism group of M with the compact-open topology. In this paper we classify the homotopy type of H(M) 0 by showing that H(M) 0 has the homotopy type of the circle if M is the plane, an open o

In this paper we study the classification of self-homeomorphisms of closed, connected, oriented 4-manifolds with infinite cyclic fundamental group up to pseudoisotopy, or equivalently up to homotopy. We find that for manifolds with even intersection form homeomorphisms are classified up to pseudoiso

Let µ be a locally positive Borel measure on a σ -compact n-manifold X, n 2. We show that there is always a µ-preserving homeomorphism of X which is maximally chaotic in that it satisfies Devaney's definition of chaos, with the sensitivity constant chosen maximally. Furthermore, maximally chaotic ho