Complexity of Unknotting of Trivial 2-knots

Abstract

We construct families of trivial 2-knots Ki in R4 such that the maximal complexity of 2-knots in any isotopy connecting Ki with the standard unknot grows faster than a tower of exponentials of any fixed height of the complexity of Ki. Here we can either construct Ki as smooth embeddings and measure their complexity as the ropelength (a.k.a the crumpledness) or construct PL-knots Ki, consider isotopies through PL knots, and measure the complexity of a PL-knot as the minimal number of flat 2-simplices in its triangulation. These results contrast with the situation of classical knots in R3, where every unknot can be untied through knots of complexity that is only polynomially higher than the complexity of the initial knot.