On the complexity of extensions of non-archimedean Polish groups admitting a compatible complete left-invariant metric

Abstract

In this article, motivated by a problem asked by Allison and Panagiotopoulos, we study a problem concerning the complexity of group extensions within a hierarchy (denoted by α-CLI and L-α-CLI) on the class of non-archimedean CLI Polish groups: Given a non-archimedean Polish group G and one of its closed normal subgroup N, suppose N and G/N are α-CLI and β-CLI, respectively. Is G always (α+β)-CLI? We provide a positive answer under a certain additional assumption. We then construct two examples yielding negative answers: for each countably infinite ordinal α, there exists a group G that is not α-CLI, but G has a 1-CLI normal subgroup N such that G/N is proper α-CLI; there exists a proper 3-CLI group U that has an abelian normal subgroup N such that U/N is also abelian. These examples also provide negative answers to the original problem raised by Allison and Panagiotopoulos. Finally, we show that if N and G/N are α-CLI and β-CLI with β>0, respectively, then G is β·(ω·α+1)-CLI, which gives an upper bound on the complexity of the extended group.