A simply connected universal fibration with unique path lifting over a Peano continuum with non-simply connected universal covering space

Abstract

We present a 2-dimensional Peano continuum T⊂eq R3 with the following properties: (1) There is a universal covering projection q:T→ T with uncountable fundamental group π1(T); (2) For every 1=[α]∈ π1(T,), there is a covering projection r:(E,e)→ (T,) such that [α]∈ r\#π1(E,e); (3) There is no universal covering projection r:E→ T; (4) The universal object p:T→ T in the category of fibrations with unique path lifting (and path-connected total space) over T has trivial fundamental group π1(T)=1; (5) p:T→ T is not a path component of an inverse limit of covering projections over T.