On dense subsets of Boolean algebras
Roman Sikorski (1963)
Colloquium Mathematicae
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Displaying similar documents to “Two sets of axioms for Boolean algebras”
On dense subsets of Boolean algebras
Boolean representation trough propositional calculus
Leon Henkin (1955)
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Representing real numbers in denumerable Boolean algebras
William Hanf (1976)
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Some remarks on Boolean duality
Wright, F.B. (1957)
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On Marczewski-Burstin representable algebras
Marek Balcerzak, Artur Bartoszewicz, Piotr Koszmider (2004)
Colloquium Mathematicae
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We construct algebras of sets which are not MB-representable. The existence of such algebras was previously known under additional set-theoretic assumptions. On the other hand, we prove that every Boolean algebra is isomorphic to an MB-representable algebra of sets.
A note on Boolean operations
Cunkle, C.H. (1959)
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The elementary-equivalence classes of clopen algebras of P-spaces
Brian Wynne (2008)
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Two Boolean algebras are elementarily equivalent if and only if they satisfy the same first-order statements in the language of Boolean algebras. We prove that every Boolean algebra is elementarily equivalent to the algebra of clopen subsets of a normal P-space.
Algebraic logic, I. Monadic boolean algebras
Paul R. Halmos (1954-1956)
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On a problem of Sikorski in the set representability of Boolean algebras
Robert Lagrange (1974)
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Boolean algebras with a unary operator
Georges Hansoul (1986)
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