EDB β€” 0Y7

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Exercises

  1. [0Y7]Through this bijection we transport the Euclidean distance from \(S^ 1\) to \(ℝ/2πœ‹\) defining

    \[ d_ e([s],[t])=|Ξ¦([s])-Ξ¦([t])|_{ℝ^ 2} ~ ~ . \]

    With this choice the map \(Ξ¦\) turns out to be an isometry between \((S^ 1,d)\) and \((ℝ/2πœ‹,d_ e)\) (see the Definition [0TK]). So the latter is a complete metric space.

    With some simple calculations it can be deduced that

    \[ d_ e([s],[t])= \sqrt{ |\cos (t)-\cos (s)|^ 2 + |\sin (t)-\sin (s)|^ 2}= \sqrt{ 2 - 2 \cos (t-s)} ~ ~ . \]

    Then we define the function

    \[ d_ a([s],[t]) = \inf \{ |s-t-2πœ‹ k| : kβˆˆβ„€\} ~ ~ , \]

    show that it is a distance on \(ℝ/2πœ‹\).

    Solution 1

    [0Y8]

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