In this paper the stability of equilibrium of nonholonomic systems, on which dissipative and nonconservative positional forces act, is considered. We have proved the theorems on the instability of equilibrium under the assumptions that: the kinetic energy, the Rayleigh’s dissipation function and the positional forces are infinitely differentiable functions; the projection of the positional force component which represents the first nontrivial form of Maclaurin’s series of that positional force to the plane, which is normal to the vectors of nonholonomic constraints in the equilibrium position, is central and repulsive (with its centre of action in the equilibrium position). The suggested theorems are generalization of the results from [V.V....
This paper deals with the problem of the instability of an equilibrium, say (q = 0, q = 0), of a lag...
International audienceThis monograph gives a complete overview on the subject of nonconservative sta...
This work gives a complete overview on the subject of nonconservative stability from the modern poin...
In connection with the problem of observability, properties of total stability restricted to classes...
There are nonholonomic systems whose stability at equilibrium points with respect to some variables ...
This paper concerns some results on stability of the equilibrium position of holonomic mechanical sy...
The Lyapunov first method generalized to the case of nonlinear differential equations is applied to ...
The stability of equilibrium states of elastic structures and other continuous systems under the act...
The investigation brings some contributions to the classical problem of inverting the Lagrange-Diric...
In this work we discuss the instabilities in mechanical systems caused by two fundamentally differen...
The book offers a unified view on classical results and recent advances in the dynamics of nonconser...
Abstract. In the first part of the paper some theoretical results (including the Lyapunov-Malkin the...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
By means of a simple example with one degree of freedom it is shown that damping forces can stabiliz...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
This paper deals with the problem of the instability of an equilibrium, say (q = 0, q = 0), of a lag...
International audienceThis monograph gives a complete overview on the subject of nonconservative sta...
This work gives a complete overview on the subject of nonconservative stability from the modern poin...
In connection with the problem of observability, properties of total stability restricted to classes...
There are nonholonomic systems whose stability at equilibrium points with respect to some variables ...
This paper concerns some results on stability of the equilibrium position of holonomic mechanical sy...
The Lyapunov first method generalized to the case of nonlinear differential equations is applied to ...
The stability of equilibrium states of elastic structures and other continuous systems under the act...
The investigation brings some contributions to the classical problem of inverting the Lagrange-Diric...
In this work we discuss the instabilities in mechanical systems caused by two fundamentally differen...
The book offers a unified view on classical results and recent advances in the dynamics of nonconser...
Abstract. In the first part of the paper some theoretical results (including the Lyapunov-Malkin the...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
By means of a simple example with one degree of freedom it is shown that damping forces can stabiliz...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
This paper deals with the problem of the instability of an equilibrium, say (q = 0, q = 0), of a lag...
International audienceThis monograph gives a complete overview on the subject of nonconservative sta...
This work gives a complete overview on the subject of nonconservative stability from the modern poin...