%0 Generic %1 GeLeSc08-1 %A Geiß, Christof %A Leclerc, Bernard %A Schröer, Jan %D 2008 %K (math.RA) (math.RT), Algebras Representation Rings Theory and %T Cluster algebra structures and semicanoncial bases for unipotent groups %U http://arxiv.org/abs/math/0703039 %X Let Q be a finite quiver without oriented cycles, and let $Łambda$ be the associated preprojective algebra. To each terminal representation M of Q (these are certain preinjective representations), we attach a natural subcategory $C_M$ of $mod(Łambda)$. We show that $C_M$ is a Frobenius category,and that its stable category is a Calabi-Yau category of dimension 2. Then we develop a theory of mutations of maximal rigid objects of $C_M$, analogous to the mutations of clusters in Fomin and Zelevinsky's theory of cluster algebras. We show that $C_M$ yields a categorification of a cluster algebra $A(C_M)$, which is not acyclic in general. We give a realization of $A(C_M)$ as a subalgebra of the graded dual of the enveloping algebra $U(\n)$, where $\n$ is a maximal nilpotent subalgebra of the symmetric Kac-Moody Lie algebra $\g$ associated to the quiver Q. Let $S^*$ be the dual of Lusztig's semicanonical basis $S$ of $U(\n)$. We show that all cluster monomials of $A(C_M)$ belong to $S^*$, and that $S^* A(C_M)$ is a basis of $A(C_M)$. Next, we prove that $A(C_M)$ is naturally isomorphic to the coordinate ring of the finite-dimensional unipotent subgroup $N(w)$ of the Kac-Moody group $G$ attached to $\g$. Here w = w(M) is the adaptable element of the Weyl group of $\g$ which we associate to each terminal representation M of Q. Moreover, we show that the cluster algebra obtained from $A(C_M)$ by formally inverting the generators of the coefficient ring is isomorphic to the coordinate ring of the unipotent cell $N^w := N (B_-wB_-)$ of G. We obtain a corresponding dual semicanonical basis of this coorindate ring.

@misc{GeLeSc08-1, abstract = {Let Q be a finite quiver without oriented cycles, and let $\Lambda$ be the associated preprojective algebra. To each terminal representation M of Q (these are certain preinjective representations), we attach a natural subcategory $C_M$ of $mod(\Lambda)$. We show that $C_M$ is a Frobenius category,and that its stable category is a Calabi-Yau category of dimension 2. Then we develop a theory of mutations of maximal rigid objects of $C_M$, analogous to the mutations of clusters in Fomin and Zelevinsky's theory of cluster algebras. We show that $C_M$ yields a categorification of a cluster algebra $A(C_M)$, which is not acyclic in general. We give a realization of $A(C_M)$ as a subalgebra of the graded dual of the enveloping algebra $U(\n)$, where $\n$ is a maximal nilpotent subalgebra of the symmetric Kac-Moody Lie algebra $\g$ associated to the quiver Q. Let $S^*$ be the dual of Lusztig's semicanonical basis $S$ of $U(\n)$. We show that all cluster monomials of $A(C_M)$ belong to $S^*$, and that $S^* \cap A(C_M)$ is a basis of $A(C_M)$. Next, we prove that $A(C_M)$ is naturally isomorphic to the coordinate ring of the finite-dimensional unipotent subgroup $N(w)$ of the Kac-Moody group $G$ attached to $\g$. Here w = w(M) is the adaptable element of the Weyl group of $\g$ which we associate to each terminal representation M of Q. Moreover, we show that the cluster algebra obtained from $A(C_M)$ by formally inverting the generators of the coefficient ring is isomorphic to the coordinate ring of the unipotent cell $N^w := N \cap (B_-wB_-)$ of G. We obtain a corresponding dual semicanonical basis of this coorindate ring.}, added-at = {2009-01-26T10:26:14.000+0100}, author = {Gei{\ss}, Christof and Leclerc, Bernard and Schr{\"o}er, Jan}, biburl = {https://www.bibsonomy.org/bibtex/2c8d93e83c7af998c0304528c46897a54/demonet}, interhash = {da732992f9d9f17d23ddaf8e04c42714}, intrahash = {c8d93e83c7af998c0304528c46897a54}, keywords = {(math.RA) (math.RT), Algebras Representation Rings Theory and}, month = {April}, pdf = {http://arxiv.org/pdf/math/0703039}, timestamp = {2009-01-26T10:26:14.000+0100}, title = {Cluster algebra structures and semicanoncial bases for unipotent groups}, url = {http://arxiv.org/abs/math/0703039}, v1descr = {Thu, 1 Mar 2007 17:35:26 GMT (40kb)}, v1url = {http://www.arxiv.org/abs/math/0703039v1}, v2descr = {Mon, 7 Apr 2008 13:36:26 GMT (94kb)}, v2url = {http://www.arxiv.org/abs/math/0703039v2}, v3descr = {Wed, 23 Apr 2008 10:33:29 GMT (96kb)}, year = 2008 }