A finitely generated, locally indicable group with no faithful action by C1 diffeomorphisms of the interval

Abstract

According to Thurston's stability theorem, every group of C1 diffeomorphisms of the closed interval is locally indicable (.e., every finitely generated subgroup factors through Z). We show that, even for finitely generated groups, the converse of this statement is not true. More precisely, we show that the semi-direct product between F2 an Z2, although locally indicable, does not embed into Diff+1 (]0,1[). (Here F2 is any free subgroup of SL(2,Z), and its action on Z2 is the projective one.) Moreover, we show that for every non-solvable subgroup G of SL(2,Z), the semi-direct product between G and Z2 does not embed into Diff1+(S1).