Groups definable in weakly o-minimal non-valuational structures

Abstract

Let M be a weakly o-minimal non-valuational structure, and N its canonical o-minimal extension (by Wencel). We prove that every group G definable in M is a subgroup of a group K definable in N, which is canonical in the sense that it is the smallest such group. As an application, we obtain that G00= G K00, and establish Pillay's Conjecture in this setting: G/G00, equipped with the logic topology, is a compact Lie group, and if G has finitely satisfiable generics, then Lie(G/G00)= (G).