Penrose tilings, infinite friezes, and the $A_\infty$-singularity

Abstract: We study Penrose tilings of the plane $\mathbb{R}^2$ and nonperiodic infinite frieze patterns from the point of view of Cohen--Macaulay representation theory: Triangulations of the completed infinity-gon correspond to subcategories of the Frobenius category $\mathcal{C}2=\mathrm{CM}{\mathbb{Z}}(\mathbb{C}[x,y]/(x^2))$, the singularity category of the curve singularity of type $A_\infty$. We relate Penrose tilings to certain triangulations of the completed infinity-gon, and thus to the corresponding subcategories of $\mathcal{C}_2$. We then extend the cluster character of Paquette and Yıldırım for a triangulated category modelling said triangulations to our setting. This allows us to define nonperiodic infinite friezes patterns coming from triangulations of the completed infinity-gon and in particular from Penrose tilings.