Three characterizations of a self-similar aperiodic 2-dimensional subshift

Abstract

The goal of this chapter is to illustrate a generalization of the Fibonacci word to the case of 2-dimensional configurations on Z2. More precisely, we consider a particular subshift of AZ2 on the alphabet A=\0,…,15\ for which we give three characterizations: as the subshift X generated by a 2-dimensional morphism defined on A; as the Wang shift Z defined by a set Z of 16 Wang tiles; as the symbolic dynamical system XPZ,RZ representing the orbits under some Z2-action RZ defined by rotations on T2 and coded by some topological partition PZ of T2 into 16 polygonal atoms. We prove their equality Z =X=XPZ,RZ by showing that they are self-similar with respect to the substitution . This chapter provides a transversal reading of results divided into four different articles obtained through the study of the Jeandel-Rao Wang shift. It gathers in one place the methods introduced to desubstitute Wang shifts and to desubstitute codings of Z2-actions by focussing on a simple 2-dimensional self-similar subshift. SageMath code to find marker tiles and compute the Rauzy induction of Z2-rotations is provided allowing to reproduce the computations. The chapter contains many exercises whose solutions are provided at the end.