Cluster structures for the $A_{\infty}$ singularity

Jenny August; Man-Wai Cheung; Eleonore Faber; Sira Gratz; Sibylle; Schroll

arXiv:2205.15344·math.RT·June 1, 2022

Cluster structures for the $A_{\infty}$ singularity

Jenny August, Man-Wai Cheung, Eleonore Faber, Sira Gratz, Sibylle, Schroll

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Abstract

We study a category $C_{2}$ of $Z$ -graded MCM modules over the $A_{\infty}$ curve singularity and demonstrate it has infinite type $A$ cluster combinatorics. In particular, we show that this Frobenius category (or a suitable subcategory) is stably equivalent to the infinite type $A$ cluster categories of Holm-Jorgensen, Fisher and Paquette-Yildirim. As a consequence, $C_{2}$ has cluster tilting subcategories modelled by certain triangulations of the (completed) $\infty$ -gon. We use the Frobenius structure to extend this further to consider maximal almost rigid subcategories, and show that these subcategories and their mutations exhibit the combinatorics of the completed $\infty$ -gon.

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TopicsAlgebraic structures and combinatorial models · Advanced Algebra and Geometry · Nonlinear Waves and Solitons