On the approximate periodicity of sequences attached to noncrystallographic root systems
classification
🧮 math.DS
math.RT
keywords
noncrystallographicrootsystemsmutationsequencesadjustingalgebrasapproximate
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We study Fomin-Zelevinsky's mutation rule in the context of noncrystallographic root systems. In particular, we construct approximately periodic sequences of real numbers for the noncrystallographic root systems of rank 2 by adjusting the exchange relation for cluster algebras. Moreover, we describe matrix mutation classes for type H3 and H4.
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