Normal systems over ANR's, rigid embeddings and nonseparable absorbing sets

Abstract

Most of results of Bestvina and Mogilski [Characterizing certain incomplete infinite-dimensional absolute retracts, Michigan Math. J. 33 (1986), 291--313] on strong Z-sets in ANR's and absorbing sets is generalized to nonseparable case. It is shown that if an ANR X is locally homotopy dense embeddable in infinite-dimensional Hilbert manifolds and w(U) = w(X) (where `w' is the topological weight) for each open nonempty subset U of X,then X itself is homotopy dense embeddable in a Hilbert manifold. It is also demonstrated that whenever X is an AR, its weak product W(X,*) = \(xn)n=1∞ ∈ Xω:\ xn = * for almost all n\ is homeomorphic to a pre-Hilbert space E with E E. An intrinsic characterization of manifolds modelled on such pre-Hilbert spaces is given.