Add to ORKGAbstract: Near its statiinary point we study solutions of an invertible system of ordinary differential equations with a square nonlinearity and with parameters υ ∈ IR and σ = ±1. The system appeared from the water-wade problem after its reduction on the center manifold and a selection of the basic first approximation and a power transformation of coordinates. In a neighbourhood of a stationary point we study the system by means of its normal form for cases σ=-1, υ∈ [-5/4,1), when all eigenvalues are pure imaginary. We develop a theory of the structure of the normal form for resonant cases. Using it, we have found local families of periodic solutions and conditionally periodic solutions.Note: Research direction:Mathema...
In this thesis we study the local solvability of a class of real analytic singular systems of nonlin...
The local theory of singular points is extended to a large class of linear, second-order, ordinary d...
We study local, analytic solutions for a class of initial value problems for singular ODEs. We prove...
Abstract: Near its statiinary point we study solutions of an invertible system of ordinary...
Abstract: Near its statiinary point we study solutions of an invertible system of ordinary...
The paper investigates singular nonlinear problems arising in hydro-dynamics. In particular, it deal...
Abstract: In a neighborhood of a stationary point we consider the n-dimensional autonomous...
It is known that existence of a formal power series solution ŷ(x) to a system of nonlinear ordinary ...
It is known that existence of a formal power series solution ŷ(x) to a system of nonlinear ordinary ...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractThe local theory of singular points is extended to a large class of linear, second-order, or...
Abstract: We consider an autonomous system of ODEs which is solved concerning derivatives....
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
summary:The paper investigates singular nonlinear problems arising in hydrodynamics. In particular, ...
In this thesis we study the local solvability of a class of real analytic singular systems of nonlin...
The local theory of singular points is extended to a large class of linear, second-order, ordinary d...
We study local, analytic solutions for a class of initial value problems for singular ODEs. We prove...
Abstract: Near its statiinary point we study solutions of an invertible system of ordinary...
Abstract: Near its statiinary point we study solutions of an invertible system of ordinary...
The paper investigates singular nonlinear problems arising in hydro-dynamics. In particular, it deal...
Abstract: In a neighborhood of a stationary point we consider the n-dimensional autonomous...
It is known that existence of a formal power series solution ŷ(x) to a system of nonlinear ordinary ...
It is known that existence of a formal power series solution ŷ(x) to a system of nonlinear ordinary ...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractWe define a class of systems of nonlinear ordinary differential equations, resolvable with r...
AbstractThe local theory of singular points is extended to a large class of linear, second-order, or...
Abstract: We consider an autonomous system of ODEs which is solved concerning derivatives....
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
summary:The paper investigates singular nonlinear problems arising in hydrodynamics. In particular, ...
In this thesis we study the local solvability of a class of real analytic singular systems of nonlin...
The local theory of singular points is extended to a large class of linear, second-order, ordinary d...
We study local, analytic solutions for a class of initial value problems for singular ODEs. We prove...