Hilbert's hotel: Difference between revisions

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== See also ==
== See also ==
*[[Galileo's paradox]]
*[[Galileo's paradox]]
*[[Countable set]]
*[[Set theory]]
*[[Set theory]]


==Related topics==
==Related topics==

Revision as of 18:04, 24 November 2007

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Hilbert's hotel is a humorous popularization of some mathematical paradoxes arising from transfinite set theory.


Introduction

The basic idea is that of a hotel with an infinite number of rooms - precisely one room for each positive integer.

It's sometimes visualized as an infinitely long corridor, with rooms numbered consecutively 1,2,3, ...

A stranger arriving at the reception when the hotel is full may get a room anyway. The management will simply send out an intercom asking every current guest to go out into the corridor, and then move into the room one step further down.

This way the first room will be left vacant for the new arrival.

By a similar procedure, any finite number of new arrivals may be accommodated.

If an infinite number of strangers arrive, they may still be accomodated. The procedure is similar to the finite case, except each current guest will be asked to move to the room with twice the current room number.

All odd-numbered rooms will then become vacant, so the first new guest may move into the first odd-numbered room (1), the second into the second odd-numbered room (3), and so on.



See also

Related topics


References

External links

  1. PlanetMath
  2. MathWorld