General Topology/Definition, characterisations: Difference between revisions

Latest revision as of 02:00, 26 March 2021

Let X be a set.
1. Prove that $𝒫 (X)$ , the power set, is a topology on $X$ (it's called the discrete topology) and that when $X$ is equipped with this topology and $f : X \to Y$ is any function where $Y$ is a topological space, then $f$ is automatically continuous.
2. Prove that ${\emptyset, X}$ is a topology on $X$ (called the trivial topology), and that when $X$ is equipped with this topology, $Z$ is any topological space and $f : Z \to X$ is any function, then $f$ is continuous.