Yann Palu
Published 2007-03-19, updated 2010-06-16Version 3
Starting from an arbitrary cluster-tilting object $T$ in a 2-Calabi--Yau category over an algebraically closed field, as in the setting of Keller and Reiten, we define, for each object $L$, a fraction $X(T,L)$ using a formula proposed by Caldero and Keller. We show that the map taking $L$ to $X(T,L)$ is a cluster character, i.e. that it satisfies a certain multiplication formula. We deduce that it induces a bijection, in the finite and the acyclic case, between the indecomposable rigid objects of the cluster category and the cluster variables, which confirms a conjecture of Caldero and Keller.
Comments: 21 pages. The numberings now coincide with those of the published version
Journal: Annales de l'Institut Fourier Tome 58, 6 (2008) 2221-2248
The cluster character for cyclic quivers
Linear recurrence relations for cluster variables of affine quivers
A new cluster character with coefficients for cluster category
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