Liftings of knots in Sg × S1 and covering of virtual knots

Abstract

A virtual link diagram is called (mod m) almost classical if it admits a (mod m) Alexander numbering. In BodenGaudreauHarperNicasWhite, it is shown that Alexander polynomial for almost classical links can be defined by using the homology of the associated infinite cyclic cover. On the other hand, in NaokoKamada an infinite family of m fold covering over a virtual knot is constructed so that it is mod m almost classical link for all m by using oriented cut point. In this paper, another way to obtain a family of m-fold coverings over a given virtual knots, which are mod m almost classical, by using knots in Sg × S1.