Hereditary Interval Algebras and Cardinal Characteristics of the Continuum
Abstract
An interval algebra is a Boolean algebra which is isomorphic to the algebra of finite unions of half-open intervals, of a linearly ordered set. An interval algebra is hereditary if every subalgebra is an interval algebra. We answer a question of M. Bekkali and S. Todorcevi\'c, by showing that it is consistent that every σ-centered interval algebra of size b is hereditary. We also show that there is, in ZFC, an hereditary interval algebra of cardinality 1.
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