I. Assem, T. Brüstle, R. Schiffler, G. Todorov
Published 2006-08-29Version 1
Let A be a hereditary algebra over an algebraically closed field. We prove that an exact fundamental domain for the m-cluster category of A is the m-left part of the m-replicated algebra $A^{(m)}$ of A. Moreover, we obtain a one-to-one correspondence between the tilting objects in the m-cluster category (that is, the m-clusters) and those tilting $A^{(m)}$-modules for which all non projective-injective direct summands lie in the m-left part of $A^{(m)}$.
Comments: 28 pages, 2 figures
A geometric description of the m-cluster categories of type D_n
A bijection between $m$-cluster-tilting objects and $(m+2)$-angulations in $m$-cluster categories
Defining an m-cluster category
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