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Abstract
We propose a conjectural correspondence between the set of rigid indecomposable modules over the path algebras of acyclic quivers and the set of certain non-self-intersecting curves on Riemann surfaces, and prove the correspondence for the two-complete rank 3 quivers.
Acknowledgments
We thank Cheol-Hyun Cho, Christof Geiss, Ralf Schiffler, Hugh Thomas, Pavel Tumarkin, Jerzy Weyman, and Nathan Williams for helpful discussions. We also thank an anonymous referee for letting us know of [Crawley-Boevey 92]. K.-H. L. gratefully acknowledges support from the Simons Center for Geometry and Physics at which some of the research for this article was performed.
Notes
1 After the first version of this paper was posted on the arXiv, Felikson and Tumarkin [Felikson and Tumarkin Citation17] proved Conjecture 1.1 for all 2-complete quivers. Moreover they characterized c-vectors in the same seed, using a collection of pairwise non-crossing admissible curves satisfying a certain word property.
2 The punctured discs appeared in Bessis’ work [Bessis Citation06]. For better visualization, here we prefer to use an alternative description using compact Riemann surfaces with one or two marked points.