Contractible open manifolds which embed in no compact, locally connected and locally 1-connected metric space

Abstract

This paper pays a visit to a famous contractible open 3-manifold W3 proposed by R. H. Bing in 1950's. By the finiteness theorem Hak68, Haken proved that W3 can embed in no compact 3-manifold. However, until now, the question about whether W3 can embed in a more general compact space such as a compact, locally connected and locally 1-connected metric 3-space was not known. Using the techniques developed in Sternfeld's 1977 PhD thesis Ste77, we answer the above question in negative. Furthermore, it is shown that W3 can be utilized to produce counterexamples for every contractible open n-manifold (n≥ 4) embeds in a compact, locally connected and locally 1-connected metric n-space.