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A Class of Irreducible Polynomials


Affiliations
1 “Ovidius” University of Constanta, Bd. Mamaia 124, 8700, Constanta, Romania
2 Institute of Mathematics of the Romanian Academy, P.O. Box 1-764, Bucharest 70700, Romania
3 Department of Mathematics, University of Illinois at Urbana-Champaign, Altgeld Hall, 1409 W. Green Street, Urbana, IL, 61801, United States
     

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For any polynomial

f (X) ∈ Q[X], write f (X) in the form f(x) =a0+a1X+....+adX/ q

 

with q,a0,a1,......,aad ∈ Z,q > 1,q as small as possible, then set

           H(f) = max{|a0|,|a1|,......,|ad|,q}

we show that for any relatively prime polynomials f(x), g(x) ∈ Q[X] with deg f < deg g = d, and any prime number p>2dd H(f)d+1 H(g)3d, the polynomial f(X) + pg(X) is irreducible over Q. we also condider the more general case of polynomial defined over a number field.


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  • A Class of Irreducible Polynomials

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Authors

Marius Cavachi
“Ovidius” University of Constanta, Bd. Mamaia 124, 8700, Constanta, Romania
Marian Vajaitu
Institute of Mathematics of the Romanian Academy, P.O. Box 1-764, Bucharest 70700, Romania
Alexandru Zaharescu
Department of Mathematics, University of Illinois at Urbana-Champaign, Altgeld Hall, 1409 W. Green Street, Urbana, IL, 61801, United States

Abstract


For any polynomial

f (X) ∈ Q[X], write f (X) in the form f(x) =a0+a1X+....+adX/ q

 

with q,a0,a1,......,aad ∈ Z,q > 1,q as small as possible, then set

           H(f) = max{|a0|,|a1|,......,|ad|,q}

we show that for any relatively prime polynomials f(x), g(x) ∈ Q[X] with deg f < deg g = d, and any prime number p>2dd H(f)d+1 H(g)3d, the polynomial f(X) + pg(X) is irreducible over Q. we also condider the more general case of polynomial defined over a number field.