Lie algebras arising from two-periodic projective complex and derived categories
報告人簡介:肖杰,北京師范大學數學科學學院教授、博士生導師。曾獲得國家杰出青年基金、教育部跨世紀人才基金,教育部自然科學一等獎等。曾擔任中國科學、數學學報、數學年刊、Algebra Colloquium等編委,Pure and Applied Mathematics Quarterly 副主編,中國數學會常務理事。2006年至2017年任清華大學數學科學系主任,2014年至2017年任清華大學理學院院長。主要從事代數表示論與量子群的交叉研究。在代數表示論、Ringel-Hall代數、量子群和范疇化等領域做出了一系列重要科研成果。相關研究成果發表于Invent. Math., Duke Math. J., Compositio Math., Adv. Math., Math. Z.等重要學術期刊。
報告內容介紹:Let A be a ?nite-dimensional C-algebra of ?nite global dimension and consider the category of ?nitely generated right A-modules. By using of the category of two-periodic projective complexes C2(P), we construct the motivic Bridgeland’s Hall algebra for A, where structure constants are given by Poincaré polynomials in t, then construct a C-Lie subalgebra g = n⊕h at t = ?1, where n is constructed by stack functions about indecomposable radical complexes, and h is by contractible complexes. For the stable category K2(P) of C2(P), we construct its moduli spaces and a C-Lie algebra ?g = ?n⊕?h, where ?n is constructed by support-indecomposable constructible functions, and ?h is by the Grothendieck group of K2(P). We prove that the natural functor C2(P) → K2(P) together with the natural isomorphism between Grothendieck groups of A and K2(P) induces a Lie algebra isomorphism g ~ = ?g. This makes clear that the structure constants at t = ?1 provided by Bridgeland in [5] in terms of exact structure of C2(P) precisely equal to that given in [30] in terms of triangulated category structure of K2(P). This is based on the joint work with J. Fang and Y. Lan.
