Banach-Tarski Paradox

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Motivation

Recall that by Vitali's Theorem, there is no function satisfying all three of the following properties:

  • is countably additive,
  • is translation invariant, and
  • for each interval , we have .

This result can be easily be generalized to higher-dimensional Euclidean spaces.

To obtain a function that can reasonably measure Euclidean space, one might try to weaken some of the above properties. However, if we weaken only the requirement that be countably additive, namely by requiring that be merely finitely additive, we still run into problems in higher dimensions, as the Banach-Tarski Paradox illustrates.

The Banach-Tarski Paradox

In 1924, Stefan Banach and Alfred Tarski proved the following result:

Let and be arbitrary bounded open sets in for . There exist