Semi-boolean and Yosida -groups, Martinez and Yosida frames, and the G+B construction
Abstract
The class of semi-boolean -groups was introduced in 1968 by A. Bigard. These are the -groups G in which the principal convex -subgroup G(a) generated by any a ∈ G is equal to the polar a . Examples include all hyperarchimedean -groups and all existentially closed abelian -groups. Ordered by inclusion, the set of convex -subgroups of a semi-boolean -group is a frame (an algebraic frame with FIP in which every element is a d-element). Related are the Yosida -groups, i.e., the -groups whose frame of convex -subgroups is a Yosida frame (an algebraic frame with FIP in which every compact element is a meet of maximal elements). Applying results on frames and Yosida frames, we obtain new characterizations of the semi-boolean and Yosida -groups, show that the former constitute a radical class and the latter do not, and present new examples with special properties. To build some of our examples, we introduce the G+B construction for -groups, an adaptation of the A+B construction from commutative algebra.
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