In this paper we determine the maximum number of polynomial solutions of Bernoulli differential equations and of some integrable polynomial Abel differential equations. As far as we know, the tools used to prove our results have not been utilized before for studying this type of questions. We show that the addressed problems can be reduced to know the number of polynomial solutions of a related polynomial equation of arbitrary degree. Then we approach to these equations either applying several tools developed to study extended Fermat problems for polynomial equations, or reducing the question to the computation of the genus of some associated planar algebraic curves
AbstractLet α,β∈Fqt∗ and let Nt(α,β) denote the number of solutions (x,y)∈Fqt∗×Fqt∗ of the equation ...
AbstractThis note deals with the problem of determining the roots of simple algebrac equations by co...
In this snapshot, we will consider the problem of finding the number of solutions to a given system ...
Altres ajuts: Universitat Jaume I grant P1-1B2015-16In this paper we deal with differential equation...
Let a(x) be non-constant and let bj(x), for j = 0, 1, 2, 3, be real or complex polynomials in the va...
We consider real trigonometric polynomial Bernoulli equations of the form A(θ)y′=B1(θ)+Bn(θ)yn where...
summary:New results are proved on the maximum number of isolated $T$-periodic solutions (limit cycle...
AbstractWe find new criteria for the existence of closed solutions in a first order polynomial diffe...
AbstractLet A, B, C denote rational numbers with AB ≠ 0 and m > n ≥ 3 arbitrary rational integers. W...
We adjoin complete first kind Abelian integrals of genus two to solve the general degree six algebra...
Let K be an algebraic number field, and let h(x)=x3+ax be a polynomial over K. We prove that there e...
In this work we consider a given root of a family of n-degree polynomials as a one-variable function...
"Finding integer solutions to polynomial equations, also known as “Diophantine geometry,” is a funda...
Using some commutative algebra we prove Max Noether’s Theorem, the Jacobi Formula and B´ezout’s The...
AbstractAbel equations of the form r′=a(t)r2+b(t)r3,t∈[t0,t1], are of interest because of their clos...
AbstractLet α,β∈Fqt∗ and let Nt(α,β) denote the number of solutions (x,y)∈Fqt∗×Fqt∗ of the equation ...
AbstractThis note deals with the problem of determining the roots of simple algebrac equations by co...
In this snapshot, we will consider the problem of finding the number of solutions to a given system ...
Altres ajuts: Universitat Jaume I grant P1-1B2015-16In this paper we deal with differential equation...
Let a(x) be non-constant and let bj(x), for j = 0, 1, 2, 3, be real or complex polynomials in the va...
We consider real trigonometric polynomial Bernoulli equations of the form A(θ)y′=B1(θ)+Bn(θ)yn where...
summary:New results are proved on the maximum number of isolated $T$-periodic solutions (limit cycle...
AbstractWe find new criteria for the existence of closed solutions in a first order polynomial diffe...
AbstractLet A, B, C denote rational numbers with AB ≠ 0 and m > n ≥ 3 arbitrary rational integers. W...
We adjoin complete first kind Abelian integrals of genus two to solve the general degree six algebra...
Let K be an algebraic number field, and let h(x)=x3+ax be a polynomial over K. We prove that there e...
In this work we consider a given root of a family of n-degree polynomials as a one-variable function...
"Finding integer solutions to polynomial equations, also known as “Diophantine geometry,” is a funda...
Using some commutative algebra we prove Max Noether’s Theorem, the Jacobi Formula and B´ezout’s The...
AbstractAbel equations of the form r′=a(t)r2+b(t)r3,t∈[t0,t1], are of interest because of their clos...
AbstractLet α,β∈Fqt∗ and let Nt(α,β) denote the number of solutions (x,y)∈Fqt∗×Fqt∗ of the equation ...
AbstractThis note deals with the problem of determining the roots of simple algebrac equations by co...
In this snapshot, we will consider the problem of finding the number of solutions to a given system ...