JOURNAL ARTICLE
Remarks on Partitioner Algebras
Year: 1991 Journal: Proceedings of the American Mathematical Society Vol: 113 (4)Pages: 1067-1067 Publisher: American Mathematical Society
Abstract
Partitioner algebras are defined in [1] and are a natural tool for studying the properties of maximal almost disjoint families of subsets of $\omega$. We answer negatively two questions which were raised in [1]. We prove that there is a model in which the class of partitioner algebras is not closed under quotients and that it is consistent that there is a Boolean algebra of cardinality ${\aleph _1}$ which is not a partitioner algebra.
Keywords:
Cardinality (data modeling) Disjoint sets Quotient Class (philosophy) Omega Algebra over a field Mathematics Pure mathematics Combinatorics Computer science Physics Artificial intelligence
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Citation History
Topics
Advanced Topology and Set Theory
Physical Sciences → Mathematics → Geometry and Topology
Rings, Modules, and Algebras
Physical Sciences → Mathematics → Algebra and Number Theory
Advanced Algebra and Logic
Physical Sciences → Computer Science → Computational Theory and Mathematics
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