Densities of Ultraproducts of Boolean Algebras

AbstractWe answer three problems by J. D. Monk on cardinal invariants of Boolean algebras. Two of these are whether taking the algebraic density πA resp. the topological density cL4 of a Boolean algebra A commutes with formation of ultraproducts; the third one compares the number of endomorphisms and of ideals of a Boolean algebra.

Download Full-text

CHOICE-FREE STONE DUALITY

Journal of Symbolic Logic ◽

10.1017/jsl.2019.11 ◽

2019 ◽

Vol 85 (1) ◽

pp. 109-148

Author(s):

NICK BEZHANISHVILI ◽

WESLEY H. HOLLIDAY

Keyword(s):

Boolean Algebra ◽

Boolean Algebras ◽

Stone Space ◽

Spectral Space ◽

Topological Representation ◽

Stone Duality ◽

Closed Sets ◽

Spectral Spaces ◽

Basic Facts ◽

Regular Open

AbstractThe standard topological representation of a Boolean algebra via the clopen sets of a Stone space requires a nonconstructive choice principle, equivalent to the Boolean Prime Ideal Theorem. In this article, we describe a choice-free topological representation of Boolean algebras. This representation uses a subclass of the spectral spaces that Stone used in his representation of distributive lattices via compact open sets. It also takes advantage of Tarski’s observation that the regular open sets of any topological space form a Boolean algebra. We prove without choice principles that any Boolean algebra arises from a special spectral space X via the compact regular open sets of X; these sets may also be described as those that are both compact open in X and regular open in the upset topology of the specialization order of X, allowing one to apply to an arbitrary Boolean algebra simple reasoning about regular opens of a separative poset. Our representation is therefore a mix of Stone and Tarski, with the two connected by Vietoris: the relevant spectral spaces also arise as the hyperspace of nonempty closed sets of a Stone space endowed with the upper Vietoris topology. This connection makes clear the relation between our point-set topological approach to choice-free Stone duality, which may be called the hyperspace approach, and a point-free approach to choice-free Stone duality using Stone locales. Unlike Stone’s representation of Boolean algebras via Stone spaces, our choice-free topological representation of Boolean algebras does not show that every Boolean algebra can be represented as a field of sets; but like Stone’s representation, it provides the benefit of a topological perspective on Boolean algebras, only now without choice. In addition to representation, we establish a choice-free dual equivalence between the category of Boolean algebras with Boolean homomorphisms and a subcategory of the category of spectral spaces with spectral maps. We show how this duality can be used to prove some basic facts about Boolean algebras.

Download Full-text

On the elementary equivalence of automorphism groups of Boolean algebras; downward Skolem Löwenheim theorems and compactness of related quantifiers

Journal of Symbolic Logic ◽

10.2307/2273187 ◽

1980 ◽

Vol 45 (2) ◽

pp. 265-283 ◽

Cited By ~ 7

Author(s):

Matatyahu Rubin ◽

Saharon Shelah

Keyword(s):

Boolean Algebra ◽

Automorphism Groups ◽

Order Logic ◽

Boolean Algebras ◽

First Order Logic ◽

Elementary Equivalence ◽

First Order ◽

Finite Models ◽

Countably Compact

AbstractTheorem 1. (◊ℵ1,) If B is an infinite Boolean algebra (BA), then there is B1, such that ∣ Aut (B1) ≤∣B1∣ = ℵ1 and 〈B1, Aut (B1)〉 ≡ 〈B, Aut(B)〉.Theorem 2. (◊ℵ1) There is a countably compact logic stronger than first-order logic even on finite models.This partially answers a question of H. Friedman. These theorems appear in §§1 and 2.Theorem 3. (a) (◊ℵ1) If B is an atomic ℵ-saturated infinite BA, Ψ Є Lω1ω and 〈B, Aut (B)〉 ⊨Ψ then there is B1, Such that ∣Aut(B1)∣ ≤ ∣B1∣ =ℵ1, and 〈B1, Aut(B1)〉⊨Ψ. In particular if B is 1-homogeneous so is B1. (b) (a) holds for B = P(ω) even if we assume only CH.

Download Full-text

On the Representation of Boolean Algebras

Canadian Mathematical Bulletin ◽

10.4153/cmb-1962-006-6 ◽

1962 ◽

Vol 5 (1) ◽

pp. 37-41 ◽

Cited By ~ 1

Author(s):

Günter Bruns

Keyword(s):

Boolean Algebra ◽

Boolean Algebras ◽

Two Systems ◽

Image Position

Let B be a Boolean algebra and let ℳ and n be two systems of subsets of B, both containing all finite subsets of B. Let us assume further that the join ∨M of every set M∊ℳ and the meet ∧N of every set N∊n exist. Several authors have treated the question under which conditions there exists an isomorphism φ between B and a field δ of sets, satisfying the conditions:

Download Full-text

Wreath Product Action on Generalized Boolean Algebras

The Electronic Journal of Combinatorics ◽

10.37236/4831 ◽

2015 ◽

Vol 22 (2) ◽

Author(s):

Ashish Mishra ◽

Murali K. Srinivasan

Keyword(s):

Finite Group ◽

Boolean Algebra ◽

Wreath Product ◽

Boolean Algebras ◽

Product Action ◽

Finite Set ◽

A Finite Group ◽

Multiplicity Free ◽

Generalized Boolean Algebra ◽

Generalized Boolean Algebras

Let $G$ be a finite group acting on the finite set $X$ such that the corresponding (complex) permutation representation is multiplicity free. There is a natural rank and order preserving action of the wreath product $G\sim S_n$ on the generalized Boolean algebra $B_X(n)$. We explicitly block diagonalize the commutant of this action.

Download Full-text

Cardinal Invariants on Boolean Algebras

10.1007/978-3-0348-0730-2 ◽

2014 ◽

Cited By ~ 2

Author(s):

J. Donald Monk

Keyword(s):

Boolean Algebras ◽

Cardinal Invariants

Download Full-text

Boolean Algebra Retracts

Canadian Journal of Mathematics ◽

10.4153/cjm-1971-034-3 ◽

1971 ◽

Vol 23 (2) ◽

pp. 339-344

Author(s):

Timothy Cramer

Keyword(s):

Boolean Algebra ◽

Dual Problem ◽

Sufficient Conditions ◽

Boolean Algebras ◽

Necessary And Sufficient Conditions ◽

Infinite Cardinal ◽

Necessary And Sufficient

A Boolean algebra B is a retract of an algebra A if there exist homomorphisms ƒ: B → A and g: A → B such that gƒ is the identity map B. Some important properties of retracts of Boolean algebras are stated in [3, §§ 30, 31, 32]. If A and B are a-complete, and A is α-generated by B, Dwinger [1, p. 145, Theorem 2.4] proved necessary and sufficient conditions for the existence of an α-homomorphism g: A → B such that g is the identity map on B. Note that if a is not an infinite cardinal, B must be equal to A. The dual problem was treated by Wright [6]; he assumed that A and B are σ-algebras, and that g: A → B is a σ-homomorphism, and gave conditions for the existence of a homomorphism ƒ:B → A such that gƒ is the identity map.

Download Full-text

Constructing Boolean Algebras for cardinal invariants

Algebra Universalis ◽

10.1007/s000120050219 ◽

2001 ◽

Vol 45 (4) ◽

pp. 353-373

Author(s):

Saharon Shelah

Keyword(s):

Boolean Algebras ◽

Cardinal Invariants

Download Full-text

More on Cichoń's diagram and infinite games

Journal of Symbolic Logic ◽

10.2307/2695071 ◽

2000 ◽

Vol 65 (4) ◽

pp. 1713-1724 ◽

Cited By ~ 2

Author(s):

Masaru Kada

Keyword(s):

Boolean Algebras ◽

Infinite Games ◽

Cardinal Invariants ◽

Cichoń’S Diagram

AbstractSome cardinal invariants from Cichoń's diagram can be characterized using the notion of cut-and-choose games on cardinals. In this paper we give another way to characterize those cardinals in terms of infinite games. We also show that some properties for forcing, such as the Sacks Property, the Laver Property and ωω-boundingness, are characterized by cut-and-choose games on complete Boolean algebras.

Download Full-text

Recursive isomorphism types of recursive Boolean algebras

Journal of Symbolic Logic ◽

10.2307/2273757 ◽

1981 ◽

Vol 46 (3) ◽

pp. 572-594 ◽

Cited By ~ 49

Author(s):

J. B. Remmel

Keyword(s):

Boolean Algebra ◽

Recursive Function ◽

Boolean Algebras ◽

Isomorphism Type ◽

Turing Degrees ◽

Main Question ◽

Partial Recursive Function ◽

Recursive Isomorphism ◽

Infinite Set ◽

The Ideal

A Boolean algebra is recursive if B is a recursive subset of the natural numbers N and the operations ∧ (meet), ∨ (join), and ¬ (complement) are partial recursive. Given two Boolean algebras and , we write if is isomorphic to and if is recursively isomorphic to , that is, if there is a partial recursive function f: B1 → B2 which is an isomorphism from to . will denote the set of atoms of and () will denote the ideal generated by the atoms of .One of the main questions which motivated this paper is “To what extent does the classical isomorphism type of a recursive Boolean algebra restrict the possible recursion theoretic properties of ?” For example, it is easy to see that must be co-r.e. (i.e., N − is an r.e. set), but can be immune, not immune, cohesive, etc? It follows from a result of Goncharov [4] that there exist classical isomorphism types which contain recursive Boolean algebras but do not contain any recursive Boolean algebras such that is recursive. Thus the classical isomorphism can restrict the possible Turing degrees of , but what is the extent of this restriction? Another main question is “What is the recursion theoretic relationship between and () in a recursive Boolean algebra?” In our attempt to answer these questions, we were led to a wide variety of recursive isomorphism types which are contained in the classical isomorphism type of any recursive Boolean algebra with an infinite set of atoms.

Download Full-text