中文

Characterizations of compact and discrete quantum groups through second duals

算子代数 2008-12-11 v4 泛函分析

摘要

A locally compact group GG is compact if and only if L1(G)L^1(G) is an ideal in L1(G)L^1(G)^{**}, and the Fourier algebra A(G)A(G) of GG is an ideal in A(G)A(G)^{**} if and only if GG is discrete. On the other hand, GG is discrete if and only if C0(G)C_0(G) is an ideal in C0(G)C_0(G)^{**}. We show that these assertions are special cases of results on locally compact quantum groups in the sense of J. Kustermans and S. Vaes. In particular, a von Neumann algebraic quantum group (M,Γ)(M,\Gamma) is compact if and only if MM_* is an ideal in MM^*, and a (reduced) CC^*-algebraic quantum group (A,Γ)(A,\Gamma) is discrete if and only if AA is an ideal in AA^{**}.

关键词

引用

@article{arxiv.math/0506493,
  title  = {Characterizations of compact and discrete quantum groups through second duals},
  author = {Volker Runde},
  journal= {arXiv preprint arXiv:math/0506493},
  year   = {2008}
}

备注

15 pages; LaTeX2e; minor edits