EDB β€” 1PN

↑ ← β†’ ↓ view in whole PDF view in whole HTML

View

English

E7

[1PN]Prerequisites:[1NW],[1PF].Let \(𝛾,𝛿\) be closed curves, but seen as maps defined on \(ℝ\), continuous and periodic of period \(1\).

Let’s discuss a new relation: we write \(π›ΎβˆΌ_ f𝛿\) if there is an increasing homeomorphism \(πœ‘:ℝ→ℝ\) such that \(πœ‘(t+1)=πœ‘(t)+1\) for every \(tβˆˆβ„\), and for which \(𝛾=𝛿 β—¦πœ‘\)

Show that this is an equivalence relation.

Compare it with the relation \(∼\).

Solution 1

[1PP]

Download PDF
Authors: "Mennucci , Andrea C. G." .
Bibliography
Book index
  • curve
  • relation, equivalence ---, between curves
  • \(\sim _f\)
  • homeomorphism
  • \(\sim \)
Managing blob in: Multiple languages
This content is available in: Italian English