中文

Classification of quasifinite $W_\infty$-modules

表示论 2007-05-23 v1 量子代数

摘要

It is proved that an irreducible quasifinite WW_\infty-module is a highest or lowest weight module or a module of the intermediate series; a uniformly bounded indecomposable weight WW_\infty-module is a module of the intermediate series. For a nondegenerate additive subgroup GG of FnF^n, where FF is a field of characteristic zero, there is a simple Lie or associative algebra W(G,n)(1)W(G,n)^{(1)} spanned by differential operators uD1m1...DnmnuD_1^{m_1}... D_n^{m_n} for uF[G]u\in F[G] (the group algebra), and mi0m_i\ge0 with i=1nmi1\sum_{i=1}^n m_i\ge1, where DiD_i are degree operators. It is also proved that an indecomposable quasifinite weight W(G,n)(1)W(G,n)^{(1)}-module is a module of the intermediate series if GG is not isomorphic to ZZ.

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引用

@article{arxiv.math/0511523,
  title  = {Classification of quasifinite $W_\infty$-modules},
  author = {Yucai Su and Bin Xin},
  journal= {arXiv preprint arXiv:math/0511523},
  year   = {2007}
}

备注

LaTeX, 11 pages. To appear in Israel Journal of Mathematics