• 제목/요약/키워드: semi-cyclotomic polynomial

검색결과 6건 처리시간 0.016초

SEMI-CYCLOTOMIC POLYNOMIALS

  • LEE, KI-SUK;LEE, JI-EUN;Kim, JI-HYE
    • 호남수학학술지
    • /
    • 제37권4호
    • /
    • pp.469-472
    • /
    • 2015
  • The n-th cyclotomic polynomial ${\Phi}_n(x)$ is irreducible over $\mathbb{Q}$ and has integer coefficients. The degree of ${\Phi}_n(x)$ is ${\varphi}(n)$, where ${\varphi}(n)$ is the Euler Phi-function. In this paper, we define Semi-Cyclotomic Polynomial $J_n(x)$. $J_n(x)$ is also irreducible over $\mathbb{Q}$ and has integer coefficients. But the degree of $J_n(x)$ is $\frac{{\varphi}(n)}{2}$. Galois Theory will be used to prove the above properties of $J_n(x)$.

CLASSIFICATION OF GALOIS POLYNOMIALS

  • LEE, KI-SUK;LEE, JI-EUN
    • 호남수학학술지
    • /
    • 제39권2호
    • /
    • pp.259-265
    • /
    • 2017
  • Galois polynomials are defined as a generalization of the Cyclotomic polynomials. Galois polynomials have integer coefficients as the cyclotomic polynomials. But they are not always irreducible. In this paper, Galois polynomials are partly classified according to the type of subgroups which defines the Galois polynomial.

GALOIS POLYNOMIALS FROM QUOTIENT GROUPS

  • Lee, Ki-Suk;Lee, Ji-eun;Brandli, Gerold;Beyne, Tim
    • 충청수학회지
    • /
    • 제31권3호
    • /
    • pp.309-319
    • /
    • 2018
  • Galois polynomials are defined as a generalization of the cyclotomic polynomials. The definition of Galois polynomials (and cyclotomic polynomials) is based on the multiplicative group of integers modulo n, i.e. ${\mathbb{Z}}_n^*$. In this paper, we define Galois polynomials which are based on the quotient group ${\mathbb{Z}}_n^*/H$.

GALOIS POLYNOMIALS

  • Lee, Ji-Eun;Lee, Ki-Suk
    • 충청수학회지
    • /
    • 제32권2호
    • /
    • pp.171-177
    • /
    • 2019
  • We associate a positive integer n and a subgroup H of the group G(n) with a polynomial $J_{n,H}(x)$, which is called the Galois polynomial. It turns out that $J_{n,H}(x)$ is a polynomial with integer coefficients for any n and H. In this paper, we provide an equivalent condition for a subgroup H to provide the Galois polynomial which is irreducible over ${\mathbb{Q}}$.

IRREDUCIBILITY OF GALOIS POLYNOMIALS

  • Shin, Gicheol;Bae, Jae Yun;Lee, Ki-Suk
    • 호남수학학술지
    • /
    • 제40권2호
    • /
    • pp.281-291
    • /
    • 2018
  • We associate a positive integer n and a subgroup H of the group $({\mathbb{Z}}/n{\mathbb{Z}})^{\times}$ with a polynomial $J_n,H(x)$, which is called the Galois polynomial. It turns out that $J_n,H(x)$ is a polynomial with integer coefficients for any n and H. In this paper, we provide an equivalent condition for a subgroup H to provide the Galois polynomial which is irreducible over ${\mathbb{Q}}$ in the case of $n=p^{e_1}_1{\cdots}p^{e_r}_r$ (prime decomposition) with all $e_i{\geq}2$.