On maximal Dynkin friezes
Abstract
The maximal entries of Dynkin friezes over the positive integers have recently been determined for all finite Dynkin types except Bn and Dn. In this note, we explicitly construct large positive integral points on affine cluster varieties of type Bn (resp. Dn), giving rise to friezes of types Bn (resp. Dn) over the positive integers with largest entries Fn+1 Fn+2 - 1 (resp. Fn Fn+1 - 1) where Fk is the k-th Fibonacci number. We conjecture that these are the maximal possible entries for their respective Dynkin types.
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