# Tagged Questions

For questions about or involving covering spaces in algebraic topology.

55 views

### On a subgroup of the deck transformation of a covering space

I'm stuck with an exercise. Suppose you have a covering space $M \rightarrow X$, and you define $G:=\{\tau \in Deck(M)|\tau(S)=S\}$, for some $2$-sphere $S$ in $M$, and $G$ acts freely by isometries ...
9 views

45 views

### Étale morphism has all its Deck transformation homotopic to identity

Is there an example that étale morphism (of degree $d,d<\infty$) $\pi: X\rightarrow Y$, s.t. all its Deck transformations homotopic to $Id_X$,except the trivial one, where $Y$ is general Enriques ...
25 views

### Involution and Covering space

Is there a connected topological space such that admits a free involution, trivial fundamental group and furthermore has the set of real number as it's covering space?
11 views

### Catalog of covering maps

Is there somewhere where I can find a list of covering maps including their base space and target space? Apart from standard examples found in notes and books I can't find much else.
53 views

### Covering spaces of $S^1 \vee S^1$: to what subgroups do these ones correspond?

The universal covering space for $S^1 \vee S^1$ is the Cayley graph, $X$, of the free group on two generators, $F\{a,b\}$. The subgroup $F\{b\}$ corresponds to the covering space ...
77 views

### Deck transformations of universal cover are isomorphic to the fundamental group - explicitly

I have read on several places that given a (say path connected) topological space $X$ and its universal covering $\tilde{X}\stackrel{p}\rightarrow X$, there is an isomorphism ...
103 views

### Universal covering and double cover functors

Cross-posted on MO Let $\mathsf{CW}$ be the category of CW-complexes and $\mathsf{CW}_*$ that of pointed CW-complexes (possibly disconnected, one basepoint in each component). I would like to know ...
75 views

### Why $f:\mathbb{C} \to \mathbb{C},~~~ z \mapsto z^3$ is not a covering map? [closed]

Can someone tell me why $f:\mathbb{C} \to \mathbb{C},~~~ z \mapsto z^3$ is not a covering map?
58 views

### Covering Space Question

I recently encountered the following: Let $p:(E, e_0) \to (B, b_0)$ be a covering map. Assume that $p_∗(\pi_1(E, e_0)) \subseteq \pi_1(B, b_0)$ is a normal subgroup. If $e_1\in p^{−1}(\{b_0\})$, then ...
99 views

### Definition of compactness unnecessarily verbose?

The definition of a compact set is given as a set, $X$, for which all open covers have a finite subcover. This seems unnecessarily verbose to me. Wouldn't it be sufficient to simply say that $X$ has ...
28 views

### Make a complex polynomial a covering map

Let $p:\mathbb{C}\to \mathbb{C}$ be a complex polynomial. Let $C:=\{p(z):p'(z)=0\}$ and $V:=\mathbb{C}\setminus C$. I want to show that $p:p^{-1}(V)\to V$ is a covering map. By inverse function ...
74 views

### Proving that the tangent vector of a simple closed curve rotates by $2 \pi$

I am trying to prove that if $\gamma(t)=(x(t),y(t))$ ,a function from the closed interval $[0,1]$ to $\mathbb{R^2}$ is a simple closed unit speed curve such that $\gamma '(0)=\gamma '(1)$. Then the ...
132 views

### A covering space of CW complex has an induced CW complex structure.

Let $X$ be a $CW$ complex, and let $q : E \rightarrow X$ be a covering map. Prove that $E$ has a $CW$ decomposition for which each cell is mapped homeomorphically by $q$ onto a cell of $X$. Hint: ...
36 views

### Lifting a principal G-bundle to a principal bundle with structure group a covering of G

Let $P\to$ be a principal $G$-bundle. Suppose $U$ covers $G$. What do we mean by a lift of $P$ with respect to $U$? Can we take $P,M,G,U$ such that no lift exists?
Let $p:X\rightarrow Y$ and $q:Y\rightarrow Z$ be covering maps. What would be an example that $q\circ p:X\rightarrow Z$ is not a covering map? I saw a counterexample here, but it was too complex. Is ...