We discuss criteria for the nonexistence, existence and computation of invariant algebraic surfaces for three-dimensional complex polynomial vector fields, thus transferring a classical problem of Poincaré from dimension two to dimension three. Such surfaces are zero sets of certain polynomials which we call semi-invariants of the vector fields. The main part of the work deals with finding degree bounds for irreducible semi-invariants of a given polynomial vector field that satisfies certain properties for its stationary points at infinity. As a related topic, we investigate existence criteria and properties for algebraic Jacobi multipliers. Some results are stated and proved for polynomial vector fields in arbitrary dimension and their inv...
It is a remarkable fact that among the known examples of quadratic semicomplete vector fields on C^3...
AbstractThe Lotka–Volterra system of autonomous differential equations consists in three homogeneous...
AbstractThe class bn of polynomial vector fields of degree n which define global flows in R2 is char...
We discuss criteria for the nonexistence, existence and computation of invariant algebraic surfaces ...
AbstractWe derive some restrictions on the possible degrees of algebraic invariant curves and on the...
Work supported by NSERC.We describe the origin and evolution of ideas on topological and polynomial ...
File size reduced on 28.10.19 by LW (LED)This work is devoted to investigating the behaviour of inva...
In this doctoral thesis we discuss invariant sets of autonomous ordinary differential equations. Fin...
In this paper we address the Poincaré problem, on plane polynomial vector fields, under some conditi...
AbstractWe investigate projections of homogeneous polynomial vector fields to level sets of homogene...
In this paper we address the Poincare problem, on plane polynomial vector fields, under some conditi...
We study the integrability of polynomial vector fields using Galois theory of linear differential eq...
We present a set of conditions enabling a polynomial system of ordinary differential equations in th...
This is a survey on the Darboux theory of integrability for polynomial vector fields, first in Rⁿ an...
AbstractDarboux theory of integrability was established by Darboux in 1878, which provided a relatio...
It is a remarkable fact that among the known examples of quadratic semicomplete vector fields on C^3...
AbstractThe Lotka–Volterra system of autonomous differential equations consists in three homogeneous...
AbstractThe class bn of polynomial vector fields of degree n which define global flows in R2 is char...
We discuss criteria for the nonexistence, existence and computation of invariant algebraic surfaces ...
AbstractWe derive some restrictions on the possible degrees of algebraic invariant curves and on the...
Work supported by NSERC.We describe the origin and evolution of ideas on topological and polynomial ...
File size reduced on 28.10.19 by LW (LED)This work is devoted to investigating the behaviour of inva...
In this doctoral thesis we discuss invariant sets of autonomous ordinary differential equations. Fin...
In this paper we address the Poincaré problem, on plane polynomial vector fields, under some conditi...
AbstractWe investigate projections of homogeneous polynomial vector fields to level sets of homogene...
In this paper we address the Poincare problem, on plane polynomial vector fields, under some conditi...
We study the integrability of polynomial vector fields using Galois theory of linear differential eq...
We present a set of conditions enabling a polynomial system of ordinary differential equations in th...
This is a survey on the Darboux theory of integrability for polynomial vector fields, first in Rⁿ an...
AbstractDarboux theory of integrability was established by Darboux in 1878, which provided a relatio...
It is a remarkable fact that among the known examples of quadratic semicomplete vector fields on C^3...
AbstractThe Lotka–Volterra system of autonomous differential equations consists in three homogeneous...
AbstractThe class bn of polynomial vector fields of degree n which define global flows in R2 is char...