Cubulated moves and discrete knots

Abstract

In this paper, we prove than given two cubic knots K1, K2 in R3, they are isotopic if and only if one can pass from one to the other by a finite sequence of cubulated moves. These moves are analogous to the Reidemeister moves for classical tame knots. We use the fact that a cubic knot is determined by a cyclic permutation of contiguous vertices of the Z3-lattice (with some restrictions), to describe some of the classic invariants and properties of the knots in terms of such cyclic permutations, by projecting onto a plane such that it is injective when restricted to the Z3-lattice and the image of the Z3-lattice is dense.