Abstract
A locally compact abelian group is called periodic if it is totally disconnected and is a directed union of its compact subgroups. Various aspects of abelian periodic groups are considered such as–decomposing them into local products of their Sylow p- subgroups,–providing new descriptions of periodic abelian torsion groups, and of–periodic abelian divisible groups and their torsion-free and their torsion components,–reviewing splitting theorems, notably for finite rank pure subgroups of (almost) finite exponent p-groups,–providing a definition of a general p-rank for all locally compact abelian p-groups.
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