Chapter 11: Julia set
Fact 11.2.15
Let \(z\) be a point on the unit circle. Then, pick a small \(\varepsilon > 0\) and draw a neighbourhood \(z \in B_\varepsilon(z) \subseteq \C\). Iterating, we cover the whole plane.
Let \(z\) be a point on the unit circle. Then, pick a small \(\varepsilon > 0\) and draw a neighbourhood \(z \in B_\varepsilon(z) \subseteq \C\). Iterating, we cover the whole plane.