A Combinatorial Formula for Rank 2 Cluster Variables
Abstract
Let r be any positive integer, and let x1, x2 be indeterminates. We consider the sequence \xn\ defined by the recursive relation xn+1 =(xnr +1)/xn-1 for any integer n. Finding a combinatorial expression for xn as a rational function of x1 and x2 has been an open problem since 2001. We give a direct elementary formula for xn in terms of subpaths of a specific lattice path in the plane. The formula is manifestly positive, providing a new proof of a result by Nakajima and Qin.
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