Algebraic concordance order of almost classical knots

Abstract

Torsion in the concordance group C of knots in S3 can be studied with the algebraic concordance group GF. Here F is a field of characteristic (F) 2. The group GF was defined by J. Levine, who also obtained an algebraic classification when F=Q. While the concordance group C is abelian, it embeds into the non-abelian virtual knot concordance group VC. It is unknown if VC admits non-classical finite torsion. Here we define the virtual algebraic concordance group VGF for almost classical knots . This is an analogue of GF for homologically trivial knots in thickened surfaces × [0,1], where is closed and oriented. The main result is an algebraic classification of VGF. A consequence of the classification is that GQ embeds into VGQ and VGQ contains many nontrivial finite-order elements that are not algebraically concordant to any classical Seifert matrix. For F=Z/2Z, we give a generalization of the Arf invariant.