Criteria for the irreducibility of a polynomial into linear factors with an application to Fermat's last theore
Praca licencjacka ma na celu przedstawienie ciekawych kryteriów nierozkładalności wielomianów. W roz...
For f(x) ∈ C[x] with f(x) 6 ≡ 0, we define f̃(x) = xdeg ff(1/x). The polynomial f ̃ is called the ...
We present criteria for determining irreducibility of reciprocal polynomials over the field of ratio...
This item was digitized from a paper original and/or a microfilm copy. If you need higher-resolution...
We prove an irreducibility criterion for polynomials with power series coefficients generalizing pre...
In many mathematical investigations such as determination of degree of a field extension, determinat...
Some generalizations of the classical Eisenstein and Schönemann Irreducibility Criteria and their ap...
The concept of irreducible polynomial is a very simple but very powerful concept. The factorization ...
Celem pracy licencjackiej jest poruszenie zagadnienia nierozkładalności wielomianów o współczynnikac...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
ii Consider a polynomial f(x) having non-negative integer coefficients with f(b) prime for some inte...
AbstractWe prove a criterion for the irreducibility of the polynomials in one indeterminate with the...
In 1956, Ehrenfeucht proved that a polynomial f <SUB>1</SUB>(x <SUB>1</SUB>) + · + f <SUB>n</SUB> (x...
AbstractThe problem of deciding whether a polynomial of positive coefficients can be factored into p...
In its simplest form, the statement of Hilbert's irreducibility theorem says that for an irreducible...
Praca licencjacka ma na celu przedstawienie ciekawych kryteriów nierozkładalności wielomianów. W roz...
For f(x) ∈ C[x] with f(x) 6 ≡ 0, we define f̃(x) = xdeg ff(1/x). The polynomial f ̃ is called the ...
We present criteria for determining irreducibility of reciprocal polynomials over the field of ratio...
This item was digitized from a paper original and/or a microfilm copy. If you need higher-resolution...
We prove an irreducibility criterion for polynomials with power series coefficients generalizing pre...
In many mathematical investigations such as determination of degree of a field extension, determinat...
Some generalizations of the classical Eisenstein and Schönemann Irreducibility Criteria and their ap...
The concept of irreducible polynomial is a very simple but very powerful concept. The factorization ...
Celem pracy licencjackiej jest poruszenie zagadnienia nierozkładalności wielomianów o współczynnikac...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
ii Consider a polynomial f(x) having non-negative integer coefficients with f(b) prime for some inte...
AbstractWe prove a criterion for the irreducibility of the polynomials in one indeterminate with the...
In 1956, Ehrenfeucht proved that a polynomial f <SUB>1</SUB>(x <SUB>1</SUB>) + · + f <SUB>n</SUB> (x...
AbstractThe problem of deciding whether a polynomial of positive coefficients can be factored into p...
In its simplest form, the statement of Hilbert's irreducibility theorem says that for an irreducible...
Praca licencjacka ma na celu przedstawienie ciekawych kryteriów nierozkładalności wielomianów. W roz...
For f(x) ∈ C[x] with f(x) 6 ≡ 0, we define f̃(x) = xdeg ff(1/x). The polynomial f ̃ is called the ...
We present criteria for determining irreducibility of reciprocal polynomials over the field of ratio...