Abstract. We describe the structure of totally disconnected minimal ω- bounded abelian groups by reducing the description to the case of those of them which are subgroups of powers of the p-adic integers Zp. In this case the description is obtained by means of a functorial correspondence, based on Pontryagin duality, between topological and linearly topologized groups introduced by Tonolo. As an application we answer the question (posed in Pseudocompact and countably compact abelian groups: Cartesian products and minimality, Trans. Amer. Math. Soc. 335 (1993), 775–790) when arbitrary powers of minimal ω-bounded abelian groups are minimal. We prove that the positive answer to this question is equivalent to non-existence of measurable cardinals.
On the minimality of powers of minimal omega-bounded abelian groups
TONOLO, ALBERTO
1999
Abstract
Abstract. We describe the structure of totally disconnected minimal ω- bounded abelian groups by reducing the description to the case of those of them which are subgroups of powers of the p-adic integers Zp. In this case the description is obtained by means of a functorial correspondence, based on Pontryagin duality, between topological and linearly topologized groups introduced by Tonolo. As an application we answer the question (posed in Pseudocompact and countably compact abelian groups: Cartesian products and minimality, Trans. Amer. Math. Soc. 335 (1993), 775–790) when arbitrary powers of minimal ω-bounded abelian groups are minimal. We prove that the positive answer to this question is equivalent to non-existence of measurable cardinals.File | Dimensione | Formato | |
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