Lagrange equations
STABILITY OF MOTION OF RAILWAY VEHICLES DESCRIBED WITH LAGRANGE EQUATIONS OF THE FIRST KIND
... Originality consists in the adaptation of Lya- punov's stability method of linear approximation to the case when the equations of railway vehicle mo- tion are written in the form of differential-algebraic ...
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Fractional Euler Lagrange Equations for Irregular Lagrangian with Holonomic Constraints
... Euler Lagrange equations for irregular Lagrangian with holonomic constraints have been ...The equations of motion are obtained using fractional Euler Lagrange equations in a similar ...
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Euler-Lagrange equations for high energy actions in QCD and in gravity
... Thus, we constructed the generally covariant Euler-Lagrange equations for the effective action in the high energy gravity. In a quasi-elastic kinematics with A ++ = 0 one of their solutions at an inertial ...
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STABILITY OF MOTION OF RAILWAY VEHICLES DESCRIBED WITH LAGRANGE EQUATIONS OF THE FIRST KIND
... by Lagrange equations of the first kind under the assumption that there are no nonlinearities with discontinuities of the right-hand ...The equations of motion are compiled in a matrix ...constraint ...
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Multiplicity of Solutions for Quasilinear Singular Euler-Lagrange Equations with Natural Growth
... The multiplicity results for N-Laplacian with critical growth of concave-convex functions has been intensively studied (see [5,6]) in earlier studies. Recently, the existence of the nonnegative bounded weak solution to ...
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Solvability of Quasilinear Euler-Lagrange Equations
... lutions of (1.1)-(1.2) without passing to the limit on m and n. Moreover, no such solution when λ > λ 0 and Ω is star-shaped for 1 < θ < p < q < p∗ p (γ + p) and γ > 1. We notice that the multiplicity ...
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A reanalysis of a strong flow gyrokinetic formalism
... Euler- Lagrange equations for the particles and the usual Maxwell equations are directly obtained by varying particle coordi- nates and ...Euler-Lagrange equations, and Poisson and ...
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Of Own and Forced Vibrations of Dissipative Inhomogeneous Mechanical Systems
... of Lagrange equations of the second kind, which after truncation turns into a finite system of the form ...differential equations, which has been widely studied [10]: ...
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Any Hamiltonian System Is Locally Equivalent to a Free Particle
... We know that the configuration space associated with a Lagrangian system with degrees of freedom is a diff- erentiable manifold of dimension ; this means that it is locally equivalent to an open subset of [3]. Therefore, ...
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Stability Problem of Ulam for Euler Lagrange Quadratic Mappings
... Euler-Lagrange equations might be called Euler-Lagrange ...and equations were not known at all in functional equations and ...differential equations is known in calculus of ...
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Formulation of Euler Lagrange and Hamilton equations involving fractional operators with regular kernel
... Euler-Lagrange equations corresponding an oscillator were stated as a se- ries formulation; in [] the fractional simple pendulum was studied using a fractional space ...
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Numerical solution of variational problems via Haar wavelet quasilinearization technique
... Abstract In this paper, a numerical solution based on Haar wavelet quasilinearization (HWQ) is used for finding the solution of nonlinear Euler-Lagrange equations which arise from the problems in calculus of ...
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ESTABLISHING THE EQUATIONS THAT DETERMINE THE VIBRATION MOVEMENT OF THE SPINDLE IN LONGITUDINAL DIRECTION AT CNC LATHE
... The paper presents a mathematical model for analysis of vibration movements in case of CNC lathes. It is a known fact that vibrations represent an important component in determining the precision of a CNC machine. The ...
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Relativistic velocity - potential hydrodynamics and stellar stability
... Euler-Lagrange equations were the general-relativistic field equations plus the equations of motion for a perfect fluid in what we have called the standard version. An essenti[r] ...
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Goldstein_21_7_12.pdf
... generalized coordinates for the system? Write the Lagrange equations for the system and, if possible, discuss the physical significance any of them might have. Reduce the problem to a single second-order ...
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Generalized Stabilities of Euler-Lagrange-Jensen (a,b)-Sextic Functional Equations in Quasi-β-Normed Spaces
... Euler- Lagrange equations are called Euler-Lagrange-Rassias equations (see [15], [25], [27], ...functional equations via the pioneering in- troduction of the ...
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On the Lagrange Stability of Motion and Final Evolutions in the Three Body Problem
... uations (1.4). However the function V in the form (3.3) is more appropriate. It is the function V in the form (3.3) which is predetermining the use of Equations (3.1), though in the construction of the function V ...
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On solving ordinary differential equations of the first order by updating the Lagrange multiplier in variational iteration method
... In this study, an iteration method is introduced for finding the solution of ordinary differential equations with initial condition. In the first re- cursive relation the idea of VIM has been ex- tended by ...
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Cylindrical, spherical and toroidal layering of smectic C liquid crystals
... 1 tan ψ . As expected these multipliers exhibit singularities on the line defect corresponding to ψ = 0 where the molecules converge at the top and bottom of the sphere. However the configuration under consideration will ...
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Stability of general multi Euler Lagrange quadratic functional equations in non Archimedean fuzzy normed spaces
... [, –, –, , , , , , , , –] for more information on different aspects of stability of functional equations. On the other hand, for some outcomes on the stability of multi-quadratic and ...
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