Amoeba order

This article provides insufficient context for those unfamiliar with the subject. Please help improve the article by providing more context for the reader. (October 2014) (Learn how and when to remove this template message)

In mathematics, the amoeba order is the partial order of open subsets of 2^ω of measure less than 1/2, ordered by reverse inclusion. Amoeba forcing is forcing with the amoeba order; it adds a measure 1 set of random reals.

There are several variations, where 2^ω is replaced by the real numbers or a real vector space or the unit interval, and the number 1/2 is replaced by some positive number ε.

The name "amoeba order" come from the fact that a subset in the amoeba order can "engulf" a measure zero set by extending a "pseudopod" to form a larger subset in the order containing this measure zero set, which is analogous to the way an amoeba eats food.

The amoeba order satisfies the countable chain condition.

References

• Kunen, Kenneth (2011), Set theory, Studies in Logic, vol. 34, London: College Publications, ISBN 978-1-84890-050-9, MR 2905394, Zbl 1262.03001