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Euler–Lagrange equation

Known as: Euler-Lagrange differential equation, Euler lagrange, E-l 
In calculus of variations, the Euler–Lagrange equation, Euler's equation, or Lagrange's equation (although the latter name is ambiguous—see… 
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Related topics

Related topics

32 relations
Action (physics)Bargmann–Wigner equationsBellman equationBeltrami identity

Broader (1)

Calculus of variations

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
Highly Cited
2016
Highly Cited
2016
On the Euler-Lagrange equation of a functional by Pólya and Szegö
We study the regularity properties of generalized solutions of the Euler-Lagrange equation of a functional involving capacity and… 
Highly Cited
2014
Highly Cited
2014
Dynamic modeling of constant curvature continuum robots using the Euler-Lagrange formalism
Dynamic models of continuum manipulators tend to become very complex, especially for spatial manipulators with multiple sections… 
Highly Cited
2011
Highly Cited
2011
Synchronization of Networks of Nonidentical Euler-Lagrange Systems With Uncertain Parameters and Communication Delays
This paper addresses the problem of synchronizing networks of nonidentical, nonlinear dynamical systems described by Euler… 
Highly Cited
2011
Highly Cited
2011
A numerical scheme for Euler–Lagrange simulation of bubbly flows in complex systems
An Eulerian–Lagrangian approach is developed for the simulation of turbulent bubbly flows in complex systems. The liquid phase is… 
Highly Cited
2010
Highly Cited
2010
Generalized Variational Problems and Euler-Lagrange equations
Highly Cited
2009
Highly Cited
2009
Distributed leaderless consensus algorithms for networked Euler–Lagrange systems
This article proposes and analyses distributed, leaderless, model-independent consensus algorithms for networked Euler–Lagrange… 
Highly Cited
2008
Highly Cited
2008
Variational problems with fractional derivatives: Euler–Lagrange equations
We generalize the fractional variational problem by allowing the possibility that the lower bound in the fractional derivative… 
Highly Cited
2008
Highly Cited
2008
Ulam Stability for the Orthogonally General Euler - Lagrange Type Functional Equation
In this paper, J. M. Rassias introduces the general Euler Lagrange type functional equation of the form. 
Highly Cited
2007
Highly Cited
2007
On fractional Euler–Lagrange and Hamilton equations and the fractional generalization of total time derivative
Abstract Fractional mechanics describe both conservative and nonconservative systems. The fractional variational principles… 
Highly Cited
1986
Highly Cited
1986
Running on four legs as though they were one
Simple locomotion algorithms provide balance for machines that run on one leg. The generalization of these one-leg algorithms for… 
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