New posts in connectedness

Is there a simply connected region with only two (or 1<N<$+\infty$) boundary points?

complex-analysis connectedness

Showing that $\{x\in\mathbb R^n: \|x\|=\pi\}\cup\{0\}$ is not connected

real-analysis general-topology connectedness

Is a continuous function simply a connected function?

general-topology continuity connectedness

A contractible space is path connected.

general-topology algebraic-topology homotopy-theory connectedness

Connected Components are Closed

general-topology connectedness

Complement of a totally disconnected compact subset of the plane

real-analysis general-topology connectedness

Complete space as a disjoint countable union of closed sets

general-topology metric-spaces examples-counterexamples connectedness baire-category

Connected topological spaces, product is connected

general-topology connectedness

Is "connected, simply connected" Redundant?

general-topology terminology connectedness

Countable product of $\mathbb{R}$ is not connected with respect to box topology

general-topology connectedness box-topology

Can I find the connected components of a graph using matrix operations on the graph's adjacency matrix?

linear-algebra graph-theory connectedness algebraic-graph-theory spectral-graph-theory

Suppose that $X$ is Hausdorff. Show that $X$ is locally path connected.

general-topology compactness connectedness path-connected

Prove that $f$ is a quotient map.

general-topology solution-verification connectedness quotient-spaces

Homeomorphism between topological space and product space

general-topology connectedness product-space

Metal Ball Cage Template Cardinality: A Brilliantly Lazy PROOF

abstract-algebra general-topology graph-theory connectedness geodesic

Proposed proof of: If $A \subset B \subset \bar{A}$ and $A$ is connected, then $B$ is connected

general-topology proof-verification metric-spaces connectedness

Study some topological properties of $I^{\aleph_0}\times I^2/M$

general-topology compactness connectedness separation-axioms path-connected

Pseudo-connected components of the subspace $X=[0,1]\times \{\frac{1}{n}\}\cup \{(0,0),(1,0)\}$

general-topology connectedness

Show that $X$ is not locally connected at $p$

general-topology connectedness

Another example of a connected but non path connected set

general-topology connectedness