中文

Group Algebras for Groups which are not Locally Compact

算子代数 2007-05-23 v3 数学物理 群论 math.MP 表示论

摘要

We generalise the definition of a group algebra so that it makes sense for non-locally compact topological groups, in particular, we require that the representation theory of the group algebra is isomorphic (in the sense of Gelfand-Raikov) to the continuous representation theory of the group, or to some other important subset of representations. We prove that a group algebra if it exists, is always unique up to isomorphism. From examples, group algebras do not always exist for non-locally compact groups, but they do exist for some. We define a convolution on the dual of the Fourier-Stieltjes algebra making it into a Banach *-algebra, we prove that a group algebra if it exists, can always be embedded in this convolution algebra, and we find sufficient conditions for a subalgebra to be a group algebra. When the group is locally compact, we obtain a new characterisation of its group algebra which does not involve the Haar measure, nor behaviour of measures on compact sets.

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引用

@article{arxiv.math/0404020,
  title  = {Group Algebras for Groups which are not Locally Compact},
  author = {Hendrik Grundling},
  journal= {arXiv preprint arXiv:math/0404020},
  year   = {2007}
}

备注

Plain TEX, 47 pages. A theorem was added, stating that the norm on the convolution algebra J(R)* is in fact a C*-norm