Add to ORKGAbstract: We consider a linear ODE's system with constant coefficients depending on several parameters. The set of stability of the system is the set of those values of parameters, for which the stationary point of the system is stable. We show that the boundary of the set of stability can be computed by means of the elimination theory and the Hurvitz rule, which are described in textbooks on algebra. We consider separately general (non-Hamiltonian) systems (S2) and Hamiltonian systems (S3). Examples of such computations are given.Note: Publication language:russia
In this report we consider systems of ordinary differential equations depending on two parameters. W...
There are many methods for identifying the stability of complex dynamic systems. Routh and Hurwitz’s...
We consider the problem of counting (stable) equilibriums of an important family of algebraic differ...
Abstract: We consider a real linear Hamiltonian system with constant coefficients dependin...
Abstract: We continue our investigation of stability of the linear Hamiltonian system whic...
Abstract: The problem of computation of the stability set of the equilibrium point of cert...
Abstract: We consider a linear Hamiltonian system with four degrees of freedom and with co...
The article presents the main stages of the algorithm for constructing the stability regions of dyna...
There are nonholonomic systems whose stability at equilibrium points with respect to some variables ...
We consider the hamiltonian system of linear differential equations with periodic coefficients. Usin...
Abstract: We consider the conditions of preserving stability of stationary point of linear...
A general class of nonlinear systems is investigated from the stand-point of global asymptotic stabi...
A common process in ODE theory is to linearize an ODE system about an equilibrium point to determine...
SIGLEAvailable from British Library Document Supply Centre- DSC:D69468/86 / BLDSC - British Library ...
Consider a linear system A(p) · x = b(p), where the elements of the ma-trix and the right-hand side...
In this report we consider systems of ordinary differential equations depending on two parameters. W...
There are many methods for identifying the stability of complex dynamic systems. Routh and Hurwitz’s...
We consider the problem of counting (stable) equilibriums of an important family of algebraic differ...
Abstract: We consider a real linear Hamiltonian system with constant coefficients dependin...
Abstract: We continue our investigation of stability of the linear Hamiltonian system whic...
Abstract: The problem of computation of the stability set of the equilibrium point of cert...
Abstract: We consider a linear Hamiltonian system with four degrees of freedom and with co...
The article presents the main stages of the algorithm for constructing the stability regions of dyna...
There are nonholonomic systems whose stability at equilibrium points with respect to some variables ...
We consider the hamiltonian system of linear differential equations with periodic coefficients. Usin...
Abstract: We consider the conditions of preserving stability of stationary point of linear...
A general class of nonlinear systems is investigated from the stand-point of global asymptotic stabi...
A common process in ODE theory is to linearize an ODE system about an equilibrium point to determine...
SIGLEAvailable from British Library Document Supply Centre- DSC:D69468/86 / BLDSC - British Library ...
Consider a linear system A(p) · x = b(p), where the elements of the ma-trix and the right-hand side...
In this report we consider systems of ordinary differential equations depending on two parameters. W...
There are many methods for identifying the stability of complex dynamic systems. Routh and Hurwitz’s...
We consider the problem of counting (stable) equilibriums of an important family of algebraic differ...