SL2-tilings with translational symmetry

Abstract

An SL2-tiling is a bi-infinite matrix in which all adjacent 2 × 2 minors are equal to 1. Positive integral SL2-tilings were introduced by Assem, Reutenauer and Smith as generalisations of classical Conway--Coxeter frieze patterns. We show that positive integral SL2-tilings with translational symmetry are in bijection with triangulations of annuli. We use this correspondence to study the properties of periodic positive integral SL2-tilings.

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