For an integer n \u3e 2 define Pn (X) = (X + 1)n – Xn – 1. Let En (X) be the remaining factor of Pn (X) in Q [X] after removing X and the cyclotomic factors X + 1 and X2 + X + 1. Then Pn (X) = X(X+1)εn (X2 + X + 1)δn En (X) where for even n εn = δn = 0; for odd n εn = 1 and δn = 0,1,2 according as n = 0, 2, 1 (mod 3). In 1903 Mirimanoff conjectured the irreducibility of En (X) over Q when n is prime. This talk will focus on eliminating any factors of degree six. A characterization of the only possible factors of Pn that are of degree six will be given as well as the primes for which these polynomials are possible factors of En
AbstractLet Ed(x) denote the “Euler polynomial” x2+x+(1−d)/4 if d≡1(mod4) and x2−d if d≡2,3(mod4). S...
In 1997, Andrew Beal [1] announced the following conjecture: Let A,B,C,m, n, and l be positive integ...
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The factorization of polynomials is a classical mathematical question. The quest of finding the fact...
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International audienceDenote by P the set of all primes and by P + (n) the largest prime factor of i...
Cyclotomy is the process of dividing a circle into equal parts, which is precisely the effect obtain...
AbstractIt is customary to define a cyclotomic polynomial Φn(x) to be ternary if n is the product of...
AbstractLet Ed(x) denote the “Euler polynomial” x2+x+(1−d)/4 if d≡1(mod4) and x2−d if d≡2,3(mod4). S...
In 1997, Andrew Beal [1] announced the following conjecture: Let A,B,C,m, n, and l be positive integ...
: Given a polynomial f 2 k[x], k a number field, we consider bounds on the number of cyclotomic fact...
This thesis investigates the Cauchy-Mirimanoff polynomials En and their close relatives Rn, Sn and T...
Abstract In 1903 Mirimanoff conjectured that Cauchy"Mirimanoff polynomials E n are irreducible over ...
The Cauchy-Mirimanoff Polynomials are a class of polynomials that naturally arise in various classic...
. For odd square-free n ? 1, the cyclotomic polynomial \Phi n (x) satisfies an identity \Phi n (x) =...
The factorization of polynomials is a classical mathematical question. The quest of finding the fact...
AbstractLet p be an odd prime and suppose that for some a, b, c ϵ Z\pZ we have that ap + bp + cp = 0...
AbstractIn this article, we study the cyclotomic polynomials of degree N−1 with coefficients restric...
We continue to explore cyclotomic factors in the descent set polynomial Qn(t), which was introduced ...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...
International audienceDenote by P the set of all primes and by P + (n) the largest prime factor of i...
Cyclotomy is the process of dividing a circle into equal parts, which is precisely the effect obtain...
AbstractIt is customary to define a cyclotomic polynomial Φn(x) to be ternary if n is the product of...
AbstractLet Ed(x) denote the “Euler polynomial” x2+x+(1−d)/4 if d≡1(mod4) and x2−d if d≡2,3(mod4). S...
In 1997, Andrew Beal [1] announced the following conjecture: Let A,B,C,m, n, and l be positive integ...
: Given a polynomial f 2 k[x], k a number field, we consider bounds on the number of cyclotomic fact...