Laurent phenomenon algebras and the discrete BKP equation
classification
🧮 math-ph
math.MP
keywords
algebrasequationlaurentphenomenonreductiondifferencediscretecluster
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We construct the Laurent phenomenon algebras the cluster variables of which satisfy the discrete BKP equation and other difference equations obtained by its reduction. These Laurent phenomenon algebras are constructed from seeds with a generalization of mutation-period property. We show that a reduction of a seed corresponds to a reduction of a difference equation.
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