{ "id": "math/0402448", "version": "v2", "published": "2004-02-27T08:23:43.000Z", "updated": "2005-01-11T20:09:51.000Z", "title": "Semicanonical bases and preprojective algebras", "authors": [ "Christof Geiss", "Bernard Leclerc", "Jan Schröer" ], "comment": "Minor corrections. Final version to appear in Annales Scientifiques de l'ENS", "categories": [ "math.RT", "math.QA" ], "abstract": "We study the multiplicative properties of the dual of Lusztig's semicanonical basis.The elements of this basis are naturally indexed by theirreducible components of Lusztig's nilpotent varieties, whichcan be interpreted as varieties of modules over preprojective algebras.We prove that the product of two dual semicanonical basis vectorsis again a dual semicanonical basis vector provided the closure ofthe direct sum of thecorresponding two irreducible components is again an irreducible component.It follows that the semicanonical basis and the canonical basiscoincide if and only if we are in Dynkin type $A_n$ with $n \\leq 4$.Finally, we provide a detailed study of the varieties of modules over the preprojectivealgebra of type $A_5$.We show that in this case the multiplicative properties ofthe dual semicanonical basis are controlled by the Ringel form of a certain tubular algebra of type (6,3,2) and by thecorresponding elliptic root system of type $E_8^{(1,1)}$.", "revisions": [ { "version": "v2", "updated": "2005-01-11T20:09:51.000Z" } ], "analyses": { "subjects": [ "14M99", "16D70", "16E20", "16G20", "16G70", "17B37", "20G42" ], "keywords": [ "preprojective algebras", "semicanonical bases", "properties ofthe dual semicanonical basis", "closure ofthe direct sum", "multiplicative properties ofthe dual" ], "note": { "typesetting": "TeX", "pages": 0, "language": "en", "license": "arXiv", "status": "editable", "adsabs": "2004math......2448G" } } }