Daniel Labardini-Fragoso
Published 2008-03-10, updated 2008-08-11Version 3
We attempt to relate two recent developments: cluster algebras associated to triangulations of surfaces by Fomin-Shapiro-Thurston, and quivers with potentials and their mutations introduced by Derksen-Weyman-Zelevinsky. To each ideal triangulation of a bordered surface with marked points we associate a quiver with potential, in such a way that whenever two ideal triangulations are related by a flip of an arc, the respective quivers with potentials are related by a mutation with respect to the flipped arc. We prove that if the surface has non-empty boundary, then the quivers with potentials associated to its triangulations are rigid and hence non-degenerate.
Comments: v3: 44 pages, 57 figures. Prop 29 of v2 generalized to Thm 36, some changes to References. In response to referee's comments: some examples added, more cases verified in proof of Thm 30 (formerly Thm 23). Submitted to Proc. London Math. Soc
Integral bases of cluster algebras and representations of tame quivers
Quivers with potentials associated to triangulated surfaces, Part II: Arc representations
Quivers with potentials associated to triangulated surfaces, Part III: tagged triangulations and cluster monomials
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