%0 Generic %1 carbone2010classification %A Carbone, Lisa %A Chung, Sjuvon %A Cobbs, Leigh %A McRae, Robert %A Nandi, Debajyoti %A Naqvi, Yusra %A Penta, Diego %D 2010 %K classification diagrams dynkin hyperbolic root %T Classification of hyperbolic Dynkin diagrams, root lengths and Weyl group orbits %U http://arxiv.org/abs/1003.0564 %X We give a criterion for a Dynkin diagram, equivalently a generalized Cartan matrix, to be symmetrizable. This criterion is easily checked on the Dynkin diagram. We obtain a simple proof that the maximal rank of a Dynkin diagram of compact hyperbolic type is 5, while the maximal rank of a symmetrizable Dynkin diagram of compact hyperbolic type is 4. Building on earlier classification results of Kac, Kobayashi-Morita, Li and Saclio\~glu, we present the 238 hyperbolic Dynkin diagrams in ranks 3-10, 142 of which are symmetrizable. For each symmetrizable hyperbolic generalized Cartan matrix, we give a symmetrization and hence the distinct lengths of real roots in the corresponding root system. For each such hyperbolic root system we determine the disjoint orbits of the action of the Weyl group on real roots. It follows that the maximal number of disjoint Weyl group orbits on real roots in a hyperbolic root system is 4.

@misc{carbone2010classification, abstract = {We give a criterion for a Dynkin diagram, equivalently a generalized Cartan matrix, to be symmetrizable. This criterion is easily checked on the Dynkin diagram. We obtain a simple proof that the maximal rank of a Dynkin diagram of compact hyperbolic type is 5, while the maximal rank of a symmetrizable Dynkin diagram of compact hyperbolic type is 4. Building on earlier classification results of Kac, Kobayashi-Morita, Li and Sa\c{c}lio\~{g}lu, we present the 238 hyperbolic Dynkin diagrams in ranks 3-10, 142 of which are symmetrizable. For each symmetrizable hyperbolic generalized Cartan matrix, we give a symmetrization and hence the distinct lengths of real roots in the corresponding root system. For each such hyperbolic root system we determine the disjoint orbits of the action of the Weyl group on real roots. It follows that the maximal number of disjoint Weyl group orbits on real roots in a hyperbolic root system is 4.}, added-at = {2013-12-23T05:48:31.000+0100}, author = {Carbone, Lisa and Chung, Sjuvon and Cobbs, Leigh and McRae, Robert and Nandi, Debajyoti and Naqvi, Yusra and Penta, Diego}, biburl = {https://www.bibsonomy.org/bibtex/203370f34d24dce60c233ff358cc4a9d6/aeu_research}, description = {Classification of hyperbolic Dynkin diagrams, root lengths and Weyl group orbits}, interhash = {f02c371e30bde85e02cb48690a180cf8}, intrahash = {03370f34d24dce60c233ff358cc4a9d6}, keywords = {classification diagrams dynkin hyperbolic root}, note = {cite arxiv:1003.0564Comment: J. Phys. A: Math. Theor (to appear)}, timestamp = {2013-12-23T05:48:31.000+0100}, title = {Classification of hyperbolic Dynkin diagrams, root lengths and Weyl group orbits}, url = {http://arxiv.org/abs/1003.0564}, year = 2010 }