A hierarchy on non-archimedean Polish groups admitting a compatible complete left-invariant metric

Abstract

In this article, we introduce a hierarchy on the class of non-archimedean Polish groups that admit a compatible complete left-invariant metric. We denote this hierarchy by α-CLI and L-α-CLI where α is a countable ordinal. We establish three results: enumerate G is 0-CLI iff G=\1G\; G is 1-CLI iff G admits a compatible complete two-sided invariant metric; and G is L-α-CLI iff G is locally α-CLI, i.e., G contains an open subgroup that is α-CLI. enumerate Subsequently, we show this hierarchy is proper by constructing non-archimedean CLI Polish groups Gα and Hα for α<ω1, such that enumerate Hα is α-CLI but not L-β-CLI for β<α; and Gα is (α+1)-CLI but not L-α-CLI. enumerate