• Title of article

    Linear preservers between matrix modules over connected commutative rings Original Research Article

  • Author/Authors

    Chongguang Cao، نويسنده , , Xian Zhang، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2005
  • Pages
    12
  • From page
    355
  • To page
    366
  • Abstract
    Let R be a connected commutative ring with identity 1 (R contains no idempotents except 0 and 1), and let Mn(R) be the R-module of all n × n matrices over R. R is said to be idempotence-diagonalizable if every idempotent matrix over R is similar to a diagonal matrix. For two arbitrary positive integers n and m, we characterize (a) linear maps from Mn(R) to Mm(R) preserving tripotence when R is any idempotence-diagonalizable ring with the units 2 and 3, and (b) linear maps from Mn(R) to Mm(R) preserving inverses (respectively, Drazin inverses, group inverses, 1 -inverses, 2 -inverses and 1, 2 -inverses) when R is either any idempotence-diagonalizable ring with the units 2 and 3, or any commutative principal ideal domain with at least one unit except for 1 and 2. These characterizations are completed by using an idempotence-preserving result obtained by Cao [Linear maps preserving idempotence on matrix modules over some rings, J. Natur. Sci. Heilongjiang Univ. 16 (1) (1999) 1–4]. Moreover, we also give a simple proof of Cao’s result.
  • Keywords
    Linear preserver , Connected commutative ring , Matrix module
  • Journal title
    Linear Algebra and its Applications
  • Serial Year
    2005
  • Journal title
    Linear Algebra and its Applications
  • Record number

    824728