A note on infinite partitions of free products of Boolean algebras
Abstract
If A is an infinite Boolean algebra the cardinal invariant a(A) is defined as the smallest size of an infinite partition of A. The cardinal a(A B), where A 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 below both a(A) and a(B). The equality a(A B)=a(A),a(B) is not known to hold for all infinite Boolean algebras A and B. Here some lower bounds of a(A B) are provided.
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