Obstructing two-torsion in the rational knot concordance group

Abstract

It is well known that there are many 2-torsion elements in the classical knot concordance group. On the other hand, it is not known if there is any torsion element in the rational knot concordance group CQ. Cha defined the algebraic rational concordance group ACQ, an analogue of the classical algebraic concordance group, and showed that ACQ∞2∞4∞. The knots that represent 2-torsions in ACQ potentially have order 2 in CQ. In this paper, we provide an obstruction for knots of order 2 in ACQ from being of finite order in CQ. Moreover, we give a family consisting of such knots that generates an infinite rank subgroup of CQ. We also note that Cha proved that in higher dimensions, the algebraic rational concordance order is the same as the rational knot concordance order. Our obstruction is based on the localized von Neumann -invariant.