A spinning construction for virtual 1-knots and 2-knots, and the fiberwise and welded equivalence of virtual 1-knots

Abstract

We succeed to generalize spun knots of classical 1-knots to the virtual 1-knot case by using the `spinning construction'. That, is, we prove the following: Let Q be a spun knot of a virtual 1-knot K by our method. The embedding type Q in S4 depends only on K. Furthermore we prove the following: The submanifolds, Q and the embedded torus made from K, defined by Satoh's method, in S4 are isotopic. We succeed to generalize the above construction to the virtual 2-knot case. Note that Satoh's method says nothing about the virtual 2-knot case. Rourke's interpretation of Satoh's method is that one puts `fiber-circles' on each point of each virtual 1-knot diagram. If there is no virtual branch point in a virtual 2-knot diagram, our way gives such fiber-circles to each point of the virtual 2-knot diagram. We prove the following: If a virtual 2-knot diagram α has a virtual branch point, α cannot be covered by such fiber-circles. We obtain a new equivalence relation, the E-equivalence relation of the set of virtual 2-knot diagrams, by using our spinning construction. We prove that there are virtual 2-knot diagrams that are virtually nonequivalent but are E-equivalent. Although Rourke claimed that two virtual 1-knot diagrams α and β are fiberwise equivalent if and only if α and β are welded equivalent, we state that this claim is wrong. We prove that two virtual 1-knot diagrams α and β are fiberwise equivalent if and only if α and β are rotational welded equivalent.