- E5
[1PH] We will use the definitions and results of the Section [2CF], in particular [0YD].
Fix \(\tilde𝛾:ℝ→ X\) continuous and periodic (of period \(1\)); we can define the map \(\hat𝛾:S^ 1→ X\) through the relation
\[ \hat𝛾\Big( (\cos (t),\sin (t))\Big)=\tilde𝛾(t)~ ~ . \]Show that this is a good definition, and that \(\hat𝛾\) is continuous.
Use the exercise [0V8] to show that every closed simple arc, when viewed equivalently as a map \(\hat𝛾:S^ 1→ X\), is a homeomorphism with its image.
EDB — 1PH
View
English
Authors:
"Mennucci , Andrea C. G."
.
Managing blob in: Multiple languages