Topological fundamental groups of locally finite infinite configuration spaces and infinite braids

Abstract

We study the topological fundamental groups of the locally finite infinite ordered configuration space \(Conflf∞()\) in the plane and the homotopy quotient of Conflf∞ by the canonical action of the infinite permutation group (): \[ Hlf(∞):=π1top(Conflf∞(),), Blf(∞):=π1top\!(Conflf∞()\!/\!/(),[e0,]). \] We prove that \(Hlf(∞)\) and \(Blf(∞)\) are non-discrete and complete topological groups. A main structural theorem identifies \(Hlf(∞)\) with a canonical locally finite inverse-limit model built from finite pure braid groups, and we construct a complete left-invariant ultrametric compatible with the quotient topology from the loop space of . The direct limit of finite pure braid groups admits a dense embedding into \(Hlf(∞)\), and we show that \(Hlf(∞)\) is the Rakov completion of this subgroup. Moreover, the direct limit of finite braid groups embeds into \(Blf(∞)\) and is dense in the finitary subgroup \(Blffin(∞)⊂eq Blf(∞)\).