Unknotting numbers for prime θ-curves up to seven crossings

Abstract

Determining unknotting numbers is a large and widely studied problem. We consider the more general question of the unknotting number of a spatial graph. We show the unknotting number of spatial graphs is subadditive. Let g be an embedding of a planar graph G, then we show u(g) ≥ \u(s) | s is a non-overlapping set of constituents of g\. Focusing on θ-curves, we determine the exact unknotting numbers of the θ-curves in the Litherland-Moriuchi Table. Additionally, we demonstrate unknotting crossing changes for all of the curves. In doing this we introduce new methods for obstructing unknotting number 1 in θ-curves.