Minimal area of the spun trefoil knot on the canonical cubulation of R4

Abstract

We say that a cubical 2-knot K2 is an embedding of the 2-sphere in the 2-skeleton of the canonical cubulation of R4; in particular, K2 is the union of m(K2) unit squares, hence m(K2) is its area. We define the minimal area of K2 as the minimum over all the areas of cubical 2-knots isotopic to the given knot type. The minimal area of a cubical 2-knot is an invariant, and the following natural question arose: Given a knot type, what area is needed for a cubical 2-knot in the canonical cubulation of R4 to realise that type with minimal area? In this paper, we answer this question for the spun trefoil knot in the weakly minimal case.