• Title of article

    Compact rings having a finite simple group of units Original Research Article

  • Author/Authors

    Jo-Ann Cohen، نويسنده , , Kwangil Koh، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 1997
  • Pages
    14
  • From page
    13
  • To page
    26
  • Abstract
    For a compact Hausdorff ring, one observes that the group of units is a totally disconnected compact topological group and is a finite simple group if and only if it possesses no nontrivial closed normal subgroups. Three classification theorems for compact rings are now given. First, those compact rings with identity having a finite simple group of units are identified. Second, a classification of all compact rings A with identity for which 2 is a unit in A, G modulo the center of G is a finite simple group and the length of W is less than or equal to 4 (or equivalently, W is a torsion group) is given where G is the group of units in A and W is the subgroup of G generated by {gset membership, variant G: g2 = 1}. Finally, those compact rings with identity having 2 as a unit and for which W is a nilpotent group are identified.
  • Journal title
    Journal of Pure and Applied Algebra
  • Serial Year
    1997
  • Journal title
    Journal of Pure and Applied Algebra
  • Record number

    817763