• Title of article

    Code–checkable group rings

  • Author/Authors

    abdelghany, noha cairo university - faculty of science - department of mathematics, Egypt , megahed, nefertiti cairo university - faculty of science - department of mathematics, Egypt

  • From page
    115
  • To page
    122
  • Abstract
    A code over a group ring is defined to be a submodule of that group ring. For a code C over a group ring RG, C is said to be checkable if there is v Ɛ RG such that C = {x Ɛ RG : xv = 0}. In [6], Jitman et al. introduced the notion of code-checkable group ring. We say that a group ring RG is code-checkable if every ideal in RG is a checkable code. In their paper, Jitman et al. gave a necessary and sufficient condition for the group ring FG, when F is a finite field and G is a finite abelian group, to be code-checkable. In this paper, we give some characterizations for code-checkable group rings for more general alphabet. For instance, a finite commutative group ring RG, with R is semisimple, is code-checkable if and only if G is π-by-cyclic π; where is the set of noninvertible primes in R. Also, under suitable conditions, RG turns out to be code-checkable if and only if it is pseudo-morphic.
  • Keywords
    Group rings , Pseudo , morphic rings , A , by , B groups , Checkable codes , Pseudo , morphic group rings
  • Journal title
    Journal Of Algebra Combinatorics Discrete Structures an‎d Applications
  • Journal title
    Journal Of Algebra Combinatorics Discrete Structures an‎d Applications
  • Record number

    2650167