1

Let $B$ be a connected space. I am wondering, which of the following are equivalent, and under which conditions?

  1. $B$ is weakly contractible.
  2. $B$ is contractible.
  3. All fibrations $E \rightarrow B$ are homotopy equivalent to a principal fibraiton $E' \times B \rightarrow B$, by a homotopy which commutes with the fibrations.
  4. All fibrations $E \rightarrow B$ are weakly equivalent to a principal fibration $E' \times B \rightarrow B$, by a homotopy which commutes with the fibrations.

I am particularly interested in (3) implies (2) and (4) implies (1).

  • and 2. are equivalent if $B$ has the homotopy type of a CW-complex. For general spaces it fails. An example is the Warsaw circle. See also https://math.stackexchange.com/questions/2652789/non-contractible-space-with-trivial-homotopy-groups
  • – Paul Frost Oct 07 '20 at 23:49
  • @PaulFrost I happened to know that one, but I am mostly interested in the relationship between the first two and the second two – Ronald J. Zallman Oct 07 '20 at 23:55