Left orderable surgeries of double twist knots II

Abstract

A slope r is called a left orderable slope of a knot K ⊂ S3 if the 3-manifold obtained by r-surgery along K has left orderable fundamental group. Consider two-bridge knots C(2m, 2n) and C(2m+1, -2n) in the Conway notation, where m 1 and n 2 are integers. By using continuous families of hyperbolic SL2(R)-representations of knot groups, it was shown in HT-genus1, Tr that any slope in (-4n, 4m) (resp. [0, \4m, 4n\)) is a left orderable slope of C(2m, 2n) (resp. C(2m, - 2n)) and in Ga that any slope in (-4n,0] is a left orderable slope of C(2m+1,-2n). However, the proofs of these results are incomplete since the continuity of the families of representations was not proved. In this paper, we complete these proofs and moreover we show that any slope in (-4n, 4m) is a left orderable slope of C(2m+1,-2n) detected by hyperbolic SL2(R)-representations of the knot group.