regular covering

Let $p\mathrm{:}E\mathrm{\to }X$ be a covering map where $E$ and $X$ are connected and locally path connected and let $X$ have a basepoint $\mathrm{*}$. The following are equivalent:

1. 1.

   The action of $\mathrm{Aut}(p)$, the group of covering transformations of $p$, is transitive on the fiber $p^{-1}(*)$,

2. 2.

   for some $e\in p^{-1}(*)$, $p_{*}\left({\pi }_1(E,e)\right)$ is a normal subgroup of ${\pi }_1(X,*)$, where $p_{*}$ denotes ${\pi }_1(p)$,

3. 3.

   $\forall e,e^{\prime }\in p^{-1}(*),p_{*}\left({\pi }_1(E,e)\right)=p_{*}\left({\pi }_1(E,e^{\prime })\right)$,

4. 4.

   there is a discrete group $G$ such that $p$ is a principal $G$-bundle.