Topology/Connectedness

To best describe what is a connected space, we shall describe first what is a disconnected space. A disconnected space is a space that can be separated into two disjoint groups, or more formally:

A space ${\displaystyle (X,{\mathcal {T}})}$ is said to be disconnected iff a pair of disjoint, non-empty open subsets ${\displaystyle X_{1},X_{2}}$ exists, such that ${\displaystyle X=X_{1}\cup X_{2}}$.

A space ${\displaystyle X}$ that is not disconnected is said to be a connected space.

1. A closed interval ${\displaystyle [a,b]}$ is connected. To show this, suppose that it was disconnected. Then there are two nonempty disjoint open sets ${\displaystyle A}$ and ${\displaystyle B}$ whose union is ${\displaystyle [a,b]}$. Let ${\displaystyle X}$ be the set equal to ${\displaystyle A}$ or ${\displaystyle B}$ and which does not contain ${\displaystyle b}$. Let ${\displaystyle s=\sup X}$. Since X does not contain b, s must be within the interval [a,b] and thus must be within either X or ${\displaystyle [a,b]\setminus X}$. If ${\displaystyle s}$ is within ${\displaystyle X}$, then there is an open set ${\displaystyle (s-\varepsilon ,s+\varepsilon )}$ within ${\displaystyle X}$. If ${\displaystyle s}$ is not within ${\displaystyle X}$, then ${\displaystyle s}$ is within ${\displaystyle [a,b]\setminus X}$, which is also open, and there is an open set ${\displaystyle (s-\varepsilon ,s+\varepsilon )}$ within ${\displaystyle [a,b]\setminus X}$. Either case implies that ${\displaystyle s}$ is not the supremum.
2. The topological space ${\displaystyle X=(0,1)\setminus \{{\frac {1}{2}}\}}$ is disconnected: ${\displaystyle A=(0,{\frac {1}{2}}),B=({\frac {1}{2}},1)}$
   A picture to illustrate:
   
   
   As you can see, the definition of a connected space is quite intuitive; when the space cannot be separated into (at least) two distinct subspaces.

Definition 1.1

A subset ${\displaystyle U}$ of a topological space ${\displaystyle X}$ is said to be clopen if it is both closed and open.

Definition 1.2

A topological space X is said to be totally disconnected if every subset of X having more than one point is disconnected under the subspace topology

If ${\displaystyle X}$ and ${\displaystyle Y}$ are homeomorphic spaces and if ${\displaystyle X}$ is connected, then ${\displaystyle Y}$ is also connected.

Proof:
Let ${\displaystyle X}$ be connected, and let ${\displaystyle f}$ be a homeomorphism. Assume that ${\displaystyle Y}$ is disconnected. Then there exists two nonempty disjoint open sets ${\displaystyle Y_{1}}$ and ${\displaystyle Y_{2}}$ whose union is ${\displaystyle Y}$. As ${\displaystyle f}$ is continuous, ${\displaystyle f^{-1}(Y_{1})}$ and ${\displaystyle f^{-1}(Y_{2})}$ are open. As ${\displaystyle f}$ is surjective, they are nonempty and they are disjoint since ${\displaystyle Y_{1}}$ and ${\displaystyle Y_{2}}$ are disjoint. Moreover, ${\displaystyle f^{-1}(Y_{1})\cup f^{-1}(Y_{2})=f^{-1}(Y)=X}$, contradicting the fact that ${\displaystyle X}$ is connected. Thus, ${\displaystyle Y=f(X)}$ is connected.
Note: this shows that connectedness is a topological property.

If two connected sets have a nonempty intersection, then their union is connected.

Proof:
Let ${\displaystyle A}$ and ${\displaystyle B}$ be two non-disjoint, connected sets. Let ${\displaystyle X}$ and ${\displaystyle Y}$ be non-empty open sets such that ${\displaystyle X\cup Y=A\cup B}$. Let ${\displaystyle a_{0}\in A}$.
Without loss of generality, assume ${\displaystyle a_{0}\in X}$.

As ${\displaystyle A}$ is connected, ${\displaystyle a\in X\forall a\in A}$ ...(1).

As ${\displaystyle Y}$ is non-empty, ${\displaystyle \exists b\in B}$ such that ${\displaystyle b\in Y}$.

Hence, similarly, ${\displaystyle b\in Y\forall b\in B}$ ...(2)
Now, consider ${\displaystyle c\in A\cap B}$. From (1) and (2), ${\displaystyle c\in X\cap Y}$, and hence ${\displaystyle X\cap Y\neq \emptyset }$. As ${\displaystyle X,Y\in {\mathcal {T}}}$ are arbitrary, ${\displaystyle A\cup B}$ is connected.

If two topological spaces are connected, then their product space is also connected.

Proof:
Let X₁ and X₂ be two connected spaces. Suppose that there are two nonempty open disjoint sets A and B whose union is X₁×X₂. If for every x∈X, {x}×X₂ is either completely within A or within B, then π₁(A) and π₁(B) are also open, and are thus disjoint and nonempty, whose union is X₁, contradicting the fact that X₁ is connected. Thus, there is an x∈X such that {x}×X₂ contains elements of both A and B. Then π₂(A∩{(x,y)}) and π₂(B∩{(x,y)}), where y is any element of X₂, are nonempty disjoint sets whose union is X₂, and which are a union of open sets in {(x,y)} (by the definition of product topology), and are thus open. This implies that X₂ is disconnected, a contradiction. Thus, X₁×X₂ is connected.

1. Show that a topological space ${\displaystyle X}$ is disconnected if and only if it has clopen sets other than ${\displaystyle \emptyset }$ and ${\displaystyle X}$ (Hint: Why is ${\displaystyle X_{1}}$ clopen?)
2. Prove that if ${\displaystyle f:X\to Y}$ is continuous and surjective (not necessarily homeomorphic), and if ${\displaystyle X}$ is connected, then ${\displaystyle Y}$ is connected.
3. Prove the Intermediate Value Theorem: if ${\displaystyle f:[a,b]\to \mathbb {R} }$ is continuous, then for any ${\displaystyle y}$ between ${\displaystyle f(a)}$ and ${\displaystyle f(b)}$, there exists a ${\displaystyle c\in [a,b]}$ such that ${\displaystyle f(c)=y}$.
4. Prove that ${\displaystyle \mathbb {R} }$ is not homeomorphic to ${\displaystyle \mathbb {R} ^{2}}$ (hint: removing a single point from ${\displaystyle \mathbb {R} }$ makes it disconnected).
5. Prove that an uncountable set given the countable complement topology is connected (this space is what mathematicians call 'hyperconnected')
6. a)Prove that the discrete topology on a set X is totally disconnected.
   
   b) Does the converse of a) hold (Hint: Even if the subspace topology on a subset of X is the discrete topology, this need not imply that the set has the discrete topology)