The Group of Boundary Fixing Homeomorphisms of the Disc is Not Left-Orderable

Abstract

A left-order on a group G is a total order < on G such that for any f, g and h in G we have f < g hf < hg. We construct a finitely generated subgroup G of Homeo (I2;δ I2), the group of those homeomorphisms of the disc that fix the boundary pointwise, and show G does not admit a left-order. Since any left-order on Homeo (I2;δ I2) would restrict to a left-order on G this shows that Homeo (I2;δ I2) does not admit a left-order. Since Homeo (I;δ I) admits a left-order it follows that neither G nor Homeo (I2;δ I2) embed in Homeo (I;δ I).