This publication presents “The new extremal criterion of stability”. “The new extremal criterion of stability” is a criterion sufficient for determining the motion stability of a mechanical system under the influence of small-amplitude high-frequency parameter oscillations. This criterion allows the calculation of stability conditions of the oscillations of a non-stable mechanical system. It does not involve the use of motion equations, rather, it uses only the Langrangian function L = T – П
The paper investigates the conditional stability of the basic steady motions of the spatial model of...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
This paper focuses on parametric vibrations excited on mechanical systems, mechanisms and machinery....
Using purely elementary methods, necessary and sufficient conditions are given for the existence of ...
Simple condition for the stability of vertical large am-plitude oscillations of nonlinear heavy spri...
The book introduces possibly the most compact, simple and physically understandable tool that can de...
The dynamic stability of single- and multi-degree-of-freedom unbalanced mass exciter systems is disc...
A method of automatic maintenance of vibration amplitude of a number of mechanisms at given level, w...
The objective of the theory of stability of motion is to establish signs that make it possible to ju...
In the thesis we investigate motions of an excited pendulum about their equilib- ria. The excitatio...
Circular criteria of robastic stability, instability and self-excited vibration for systems with non...
The physicochemical and sorption properties of such wastes of the agro-industrial complex of Turkmen...
Using the Lagrangian formulation, the equations of motion are set up for a damped extensible pendulu...
By the use of intervalmethods it is proven that there exists an unstable periodic solution to the da...
A conventional pendulum has two equilibria, the lower one, and the upper one. This paper presents th...
The paper investigates the conditional stability of the basic steady motions of the spatial model of...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
This paper focuses on parametric vibrations excited on mechanical systems, mechanisms and machinery....
Using purely elementary methods, necessary and sufficient conditions are given for the existence of ...
Simple condition for the stability of vertical large am-plitude oscillations of nonlinear heavy spri...
The book introduces possibly the most compact, simple and physically understandable tool that can de...
The dynamic stability of single- and multi-degree-of-freedom unbalanced mass exciter systems is disc...
A method of automatic maintenance of vibration amplitude of a number of mechanisms at given level, w...
The objective of the theory of stability of motion is to establish signs that make it possible to ju...
In the thesis we investigate motions of an excited pendulum about their equilib- ria. The excitatio...
Circular criteria of robastic stability, instability and self-excited vibration for systems with non...
The physicochemical and sorption properties of such wastes of the agro-industrial complex of Turkmen...
Using the Lagrangian formulation, the equations of motion are set up for a damped extensible pendulu...
By the use of intervalmethods it is proven that there exists an unstable periodic solution to the da...
A conventional pendulum has two equilibria, the lower one, and the upper one. This paper presents th...
The paper investigates the conditional stability of the basic steady motions of the spatial model of...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
This paper focuses on parametric vibrations excited on mechanical systems, mechanisms and machinery....