The minimum plane path for movable end-points and the nonsimultaneous variations

The paper deals with the problem of existence of the minimum path for movable end-points in the one-of-degree-of-freedom mechanical system. The criteria for obtaining of extremum path for movable end-points is extended with new criteria for minimum. The nonsimultaneous variational calculus is applied. It is assumed that the actual path belongs to sub-set C ² of admissible curves. The series expansion up to the second order small values is applied and the first and the second variation of functional are calculated. It is proved that the necessary and sufficient conditions for the minimum path are that the first order variation is zero and the second order variation is positive. The second conditions are based on the arbitrary solution of Riccati’s differential equation and also the known Legender’s and Jacobi criteria for minimum for the case of fixed end-points. Two examples are solved: the problem of the minimal length of a curve joining two fixed boundary curves and problem of motion of a particle between variable boundaries for which the Hamilton action integral is minimal.     

Pure odd-order oscillators with constant excitation

In this paper the excited vibrations of a truly nonlinear oscillator are analyzed. The excitation is assumed to be constant and the nonlinearity is pure (without a linear term). The mathematical model is a second-order nonhomogeneous differential equation with strong nonlinear term. Using the first integral, the exact value of period of vibration i.e., angular frequency of oscillator described with a pure nonlinear differential equation with constant excitation is analytically obtained. The closed form solution has the form of gamma function. The period of vibration depends on the value of excitation and of the order and coefficient of the nonlinear term. For the case of pure odd-order-oscillators the approximate solution of differential equation is obtained in the form of trigonometric function. The solution is based on the exact value of period of vibration. For the case when additional small perturbation of the pure oscillator acts, the so called ‘Cveticanin's averaging method’ for a truly nonlinear oscillator is applied. Two special cases are considered: one, when the additional term is a function of distance, and the second, when damping acts. To prove the correctness of the method the obtained results are compared with those for the linear oscillator. Example of pure cubic oscillator with constant excitation and linear damping is widely discussed. Comparing the analytically obtained results with exact numerical ones it is concluded that they are in a good agreement. The investigations reported in the paper are of special interest for those who are dealing with the problem of vibration reduction in the oscillator with constant excitation and pure nonlinear restoring force the examples of which can be found in various scientific and engineering systems. For example, such mechanical systems are seats in vehicles, supports for machines, cutting machines with periodical motion of the cutting tools, presses, etc. The examples can be find in electronics (electromechanical devices like micro-actuators and micro oscillators), in music instruments (hammers in piano), in human voice producing folds (voice cords), etc.     

Nonlinear vibration of stringer shell by means of extended Hamiltonian approach

In this paper, the nonlinear free vibration of a stringer shell is studied. The mathematical model of the string shell, which is the most convenient for frequency analysis, is considered. Due to the geometrical properties of the vibrating shell, strong nonlinearities are evident. Approximate analytical expressions for the nonlinear vibration are provided by introducing the extended version of the Hamiltonian approach. The method suggested in the paper gives the approximate solution for the differential equation with dissipative term for which the Lagrangian exists. The aim of this study is to provide engineers and designers with an easy method for determining the shell nonlinear vibration frequency and nonlinear behavior. The effects of different parameters on the ratio of nonlinear to linear natural frequency of shells are studied. This analytical representation gives excellent approximations to the numerical solutions for the whole range of the oscillation amplitude, reducing the respective error of the angular frequency in comparison with the Hamiltonian approach. This study shows that a first-order approximation of the Hamiltonian approach leads to highly accurate solutions that are valid for a wide range of vibration amplitudes.     

Beck's rod with shear,compressibility and pulsating force

In-plane motion of an elastic rod, subjected to a compressive follower force is analyzed. Equations of motions are derived for the case when deformations are not small. It is assumed that the compressive force has a periodic component, so that a parametric instability is possible. The stability bound is estimated analytically and determined numerically. In deriving the differential equations of motion a generalized constitutive equation taking into account compressibility of the rod axis and the influence of shear stresses is used.     

Modelling and analysis of the nonlinear string-mass structure of the vibration absorber

ABSTRACT

In this paper a nonlinear string-mass structure of the vibration absorber is analyzed. This structure is convenient to be installed in vibration damping systems of high buildings for their protection in the case of earthquake. The considered string-mass structure contains a translator movable mass connected with two strings. Due to nonlinear geometric properties of the system the motion of the mass is described with a strong nonlinear second order differential equation. In the paper the approximate procedure for solving of the nonlinear equation of motion is developed. Based on the solution the influence of the string preloading force, slider mass and friction force on the vibration property of the string-mass system is investigated. It is concluded that variation of the preloading string force may be applied as a control parameter for vibration absorption and as the regulator of vibration decay time.     

Pflüger rod with shear and extensibility

Summary The stability of a thin elastic rod loaded with non-conservative tangentially distributed and axial compressive force is analyzed. The axial compressive force has constant and periodic component. Also it is assumed that the rod axis is extensible and shear stress effects are taken into account. The in-plane vibrations and stability of the rod are analyzed. The critical load is also determined.

---

Pflüger Stab mit Schubspannungsinfluß und dehnbarer Achse

Übersicht Es wird die Stabilität eines dünnen Stabes, der durch eine nichtkonservative Tangential-und eine Längskraft beansprucht wird, betrachtet. Die axiale Längskraft besitzt eine Konstante und eine periodische Komponente. Es wird angenommen, daß die Stabachse dehnbar ist; der Schubspannungseinfluß wird berücksichtigt. Es werden die ebenen Schwingungen und das Stabilitätsverhalten untersucht; ebenso wird die kritische Last ermittelt.

     

Extension of Melnikov criterion for the differential equation with complex function

The present paper presents an extension of Melnikov's theory for the differential equation with complex function. The sufficient condition for the existence of a homoclinic orbit in the solutions of a perturbed equation is given. The method shown in the paper is used to derive a precursor criterion for chaos. Suitable conditions are defined for the parameters of equations for which the equation possesses a strange attractor set. The analytical results are compared with numerical ones, and a good agreement is found between them.