AbstractA multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial is absolutely irreducible if its Newton polytope is indecomposable in the sense of Minkowski sum of polytopes. Two general constructions of indecomposable polytopes are given, and they give many simple irreducibility criteria including the well-known Eisenstein criterion. Polynomials from these criteria are over any field and have the property of remaining absolutely irreducible when their coefficients are modified arbitrarily in the field, but keeping a certain collection of them nonzero
AbstractThere has been some interest in finding irreducible polynomials of the type f(A(x)) for cert...
Some generalizations of the classical Eisenstein and Schönemann Irreducibility Criteria and their ap...
AbstractLet v be a real valuation of a field K with valuation ring Rv. Let K(θ) be a finite separabl...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
This thesis is a contribution to determine the absolute irreducibility of polynomials via their Newt...
AbstractOstrowski established in 1919 that an absolutely irreducible integral polynomial remains abs...
We present a simple proof of Königsberg's Criterion, [K] p.69 and also present families of irreducib...
Polynomial factorization over a field is very useful in algebraic number theory, in extensions of va...
A polynomial with rational coefficients is said to be pure with respect to a rational prime $p$ if i...
AbstractWe characterize the polynomials P(X, Y) that are irreducible over a number field K and such ...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
AbstractThe absolute irreducibility of a polynomial with rational coefficients can usually be proved...
AbstractLet f(X,Y)∈Z[X,Y] be an irreducible polynomial over Q. We give a Las Vegas absolute irreduci...
AbstractIndecomposable polynomials are a special class of absolutely irreducible polynomials. Some i...
International audienceLet $f(X,Y) \in \ZZ[X,Y]$ be an irreducible polynomial over $\QQ$. We give a L...
AbstractThere has been some interest in finding irreducible polynomials of the type f(A(x)) for cert...
Some generalizations of the classical Eisenstein and Schönemann Irreducibility Criteria and their ap...
AbstractLet v be a real valuation of a field K with valuation ring Rv. Let K(θ) be a finite separabl...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
This thesis is a contribution to determine the absolute irreducibility of polynomials via their Newt...
AbstractOstrowski established in 1919 that an absolutely irreducible integral polynomial remains abs...
We present a simple proof of Königsberg's Criterion, [K] p.69 and also present families of irreducib...
Polynomial factorization over a field is very useful in algebraic number theory, in extensions of va...
A polynomial with rational coefficients is said to be pure with respect to a rational prime $p$ if i...
AbstractWe characterize the polynomials P(X, Y) that are irreducible over a number field K and such ...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
AbstractThe absolute irreducibility of a polynomial with rational coefficients can usually be proved...
AbstractLet f(X,Y)∈Z[X,Y] be an irreducible polynomial over Q. We give a Las Vegas absolute irreduci...
AbstractIndecomposable polynomials are a special class of absolutely irreducible polynomials. Some i...
International audienceLet $f(X,Y) \in \ZZ[X,Y]$ be an irreducible polynomial over $\QQ$. We give a L...
AbstractThere has been some interest in finding irreducible polynomials of the type f(A(x)) for cert...
Some generalizations of the classical Eisenstein and Schönemann Irreducibility Criteria and their ap...
AbstractLet v be a real valuation of a field K with valuation ring Rv. Let K(θ) be a finite separabl...