Hostname: page-component-cd9895bd7-lnqnp Total loading time: 0 Render date: 2024-12-25T18:58:46.289Z Has data issue: false hasContentIssue false

Maximal irredundance and maximal ideal independence in Boolean algebras

Published online by Cambridge University Press:  12 March 2014

J. Donald Monk*
Affiliation:
Department of Mathematics, University of Colorado, UCB395, Boulder, CO 80309, USA, E-mail: don.monk@colorado.edu

Extract

Recall that a subset X of an algebra A is irredundant iff x ∉ 〈X∖{x}〉 for all x ϵ X, where 〈X∖{x}) is the subalgebra generated by X∖{x}. By Zorn's lemma there is always a maximal irredundant set in an algebra. This gives rise to a natural cardinal function Irrmm(A) = min{∣X∣: X is a maximal irredundant subset of A}. The first half of this article is devoted to proving that there is an atomless Boolean algebra A of size 2ω for which Irrmm(A) = ω.

A subset X of a BA A is ideal independent iff x ∉ (X∖{x}〉id for all x ϵ X, where 〈X∖{x}〉id is the ideal generated by X∖{x}. Again, by Zorn's lemma there is always a maximal ideal independent subset of any Boolean algebra. We then consider two associated functions. A spectrum function

Sspect(A) = {∣X∣: X is a maximal ideal independent subset of A}

and the least element of this set, smm(A). We show that many sets of infinite cardinals can appear as Sspect(A). The relationship of Smm to similar “continuum cardinals” is investigated. It is shown that it is relatively consistent that Smm/fin) < 2ω.

We use the letter s here because of the relationship of ideal independence with the well-known cardinal invariant spread; see Monk [5]. Namely, sup{∣X∣: X is ideal independent in A} is the same as the spread of the Stone space Ult(A); the spread of a topological space X is the supremum of cardinalities of discrete subspaces.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 2008

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

[1]Blass, A., Combinatorial cardinal characteristics of the continuum, Handbook of set theory, to appear.Google Scholar
[2]Koppelberg, S., The general theory of Boolean algebras, Handbook on Boolean algebras, vol. 1, North-Holland, 1989.Google Scholar
[3]Kunen, K., Set theory, North Holland, 1980.Google Scholar
[4]Mckenzie, R. and Monk, J. D., On some small cardinals for Boolean algebras, this Journal, vol. 69 (2004), pp. 674682.Google Scholar
[5]Monk, J. D., Cardinal invariants on Boolean algebras, Birkhäuser, 1996.CrossRefGoogle Scholar
[6]Monk, J. D., Continuum cardinals generalized to Boolean algebras, this Journal, vol. 66 (2001), no. 4, pp. 19281958.Google Scholar