Revista Integración (Mar 2018)

When is R[x] a principal ideal ring?

  • Henry Chimal-Dzul,
  • C. A. López-Andrade

DOI
https://doi.org/10.18273/revint.v35n2-2017001
Journal volume & issue
Vol. 35, no. 2

Abstract

Read online

Because of its interesting applications in coding theory, cryptography, and algebraic combinatoris, in recent decades a lot of attention has been paid to the algebraic structure of the ring of polynomials R[x], where R is a finite commutative ring with identity. Motivated by this popularity, in this paper we determine when R[x] is a principal ideal ring. In fact, we prove that R[x] is a principal ideal ring if and only if R is a finite direct product of finite fields

Keywords