Cluster Algebras and Binary Subwords

Rachel Bailey; Emily Gunawan

doi:10.1007/s11083-021-09562-7

Cluster Algebras and Binary Subwords

Rachel Bailey
, Emily Gunawan

Mathematical Sciences

Research output: Contribution to journal › Article

Abstract

This paper establishes a connection between binary subwords and perfect matchings of a snake graph, an important tool in the theory of cluster algebras. Every binary expansion w can be associated to a piecewise-linear poset P and a snake graph G. We construct a tree structure called the antichain trie which is isomorphic to the trie of subwords introduced by Leroy, Rigo, and Stipulanti. We then present bijections from the subwords of w to the antichains of P and to the perfect matchings of G.

Original language	English
Journal	Order
Volume	39
Issue number	1
DOIs	https://doi.org/10.1007/s11083-021-09562-7
State	Published - 2022

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AB - This paper establishes a connection between binary subwords and perfect matchings of a snake graph, an important tool in the theory of cluster algebras. Every binary expansion w can be associated to a piecewise-linear poset P and a snake graph G. We construct a tree structure called the antichain trie which is isomorphic to the trie of subwords introduced by Leroy, Rigo, and Stipulanti. We then present bijections from the subwords of w to the antichains of P and to the perfect matchings of G.

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Cluster Algebras and Binary Subwords

Abstract

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