Y-frieze patterns
Abstract
Motivated by cluster ensembles, we introduce a new variant of frieze patterns associated to acyclic cluster algebras, which we call Y-frieze patterns. Using the mutation rules for Y-variables, we define a large class of Y-frieze patterns called unitary Y-frieze patterns, and show that the ensemble map induces a map from (unitary) frieze patterns to (unitary) Y-frieze patterns. In rank 2, we show that Y-frieze patterns are (associated to) friezes of generalised cluster algebras. In finite type (not necessarily rank 2), we show that Y-frieze patterns share the same symmetries as frieze patterns, and prove that their number is finite.
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