Results 21 to 30 of about 47,397 (182)
Free complete extensions of Boolean algebras [PDF]
Pacific Journal of Mathematics, 1965 George Day
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Free Products of $\alpha$-Distributive Boolean Algebras.
MATHEMATICA SCANDINAVICA, 1959 D. J. Christensen, R. S. Pierce
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Uniqueness of representations of a distributive lattice as a free product of a Boolean algebra and a chain [PDF]
, 1971 Raymond Balbes, Ph. Dwinger
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A note on infinite partitions of free products of Boolean algebras [PDF]
Pacific Journal of MathematicsIf $A$ is an infinite Boolean algebra the cardinal invariant $\mathfrak{a}(A)$ is defined as the smallest size of an infinite partition of $A$. The cardinal $\mathfrak{a}(A\oplus B)$, where $A\oplus B$ is the free product of the Boolean algebras $A$ and $B$ (whose dual topological space is the product of the dual topological spaces of $A$ and $B$), is ...
Mario Jardón Santos
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Boolean algebras of unambiguous context-free languages
, 2008 Several recent works have studied subfamilies of deterministic context-free languages with good closure properties, for instance the families of input-driven or visibly pushdown languages, or more generally families of languages accepted by pushdown automata whose stack height can be uniquely determined by the input word read so far.
Didier Caucal
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Embedding of free Boolean algebras in complete Boolean algebras [PDF]
Journal of Soviet Mathematics, 1975 S. V. Kislyakov
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Two properties of free Boolean algebras [PDF]
Colloquium Mathematicum, 1974 Alexander Abian
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On free products of m-distributive Boolean algebras [PDF]
Colloquium Mathematicum, 1963 Roman Sikorski, Tadeusz Traczyk
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A Note to Rieger's Paper „On Free $ℵ_ξ$ -complete Boolean Algebras" [PDF]
Fundamenta Mathematicae, 1951 Roman Sikorski
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On the Boolean algebra tensor product via Carathéodory spaces of place functions
Proceedings of the American Mathematical Society, Series B, 2023 We show that the Carathéodory space of place functions on the free product of two Boolean algebras is Riesz isomorphic with Fremlin’s Archimedean Riesz space tensor product of their respective Carathéodory spaces of place functions. We provide a solution
G. Buskes, Page Thorn
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