Esther Banaian, Sunita Chepuri, Elizabeth Kelley, Sylvester W. Zhang, “Rooted Clusters for Graph LP Algebras”, SIGMA, 2022, Volume 18,089, 30 pp.

Rooted Clusters for Graph LP Algebras

Esther Banaian^a, Sunita Chepuri^b, Elizabeth Kelley^c, Sylvester W. Zhang^d

^a Department of Mathematics, Aarhus University, 8000 Aarhus, Denmark
^b Department of Mathematics, Lafayette College, Easton, PA 18042, USA
^c Department of Mathematics, University of Illinois Urbana-Champaign, Urbana, IL 61801, USA
^d School of Mathematics, University of Minnesota, Minneapolis, MN 55455, USA

Abstract: LP algebras, introduced by Lam and Pylyavskyy, are a generalization of cluster algebras. These algebras are known to have the Laurent phenomenon, but positivity remains conjectural. Graph LP algebras are finite LP algebras encoded by a graph. For the graph LP algebra defined by a tree, we define a family of clusters called rooted clusters. We prove positivity for these clusters by giving explicit formulas for each cluster variable. We also give a combinatorial interpretation for these expansions using a generalization of $T$-paths.

Keywords: Laurent phenomenon algebra, cluster algebra, graph LP algebra, $T$-path.

MSC: 05E15, 05C70

Received: October 13, 2021; in final form November 17, 2022; Published online November 24, 2022

Language: English

DOI: 10.3842/SIGMA.2022.089