Virtual Seifert Surfaces

Abstract

A virtual knot that has a homologically trivial representative K in a thickened surface × [0,1] is said to be an almost classical (AC) knot. K then bounds a Seifert surface F⊂ × [0,1]. Seifert surfaces of AC knots are useful for computing concordance invariants and slice obstructions. However, Seifert surfaces in × [0,1] are difficult to construct. Here we introduce virtual Seifert surfaces of AC knots. These are planar figures representing F ⊂ × [0,1]. An algorithm for constructing a virtual Seifert surface from a Gauss diagram is given. This is applied to computing signatures and Alexander polynomials of AC knots. A canonical genus of AC knots is also studied. It is shown to be distinct from the virtual canonical genus of Stoimenow-Tchernov-Vdovina.