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Lagrangian descriptions of dissipative systems: a review

Alberto Maria Bersani, Paolo Caressa

2020Mathematics and Mechanics of Solids45 citationsDOI

Abstract

In this paper, we review classical and recent results on the Lagrangian description of dissipative systems. After having recalled Rayleigh extension of Lagrangian formalism to equations of motion with dissipative forces, we describe Helmholtz conditions, which represent necessary and sufficient conditions for the existence of a Lagrangian function for a system of differential equations. These conditions are presented in different formalisms, some of them published in the last decades. In particular, we state the necessary and sufficient conditions in terms of multiplier factors, discussing the conditions for the existence of equivalent Lagrangians for the same system of differential equations. Some examples are discussed, to show the application of the techniques described in the theorems stated in this paper.

Topics & Concepts

Dissipative systemRotation formalisms in three dimensionsLagrangianMathematicsLagrange multiplierHelmholtz free energyDissipative operatorFormalism (music)Differential equationInverse problem for Lagrangian mechanicsEquations of motionApplied mathematicsDynamical systems theoryMathematical analysisClassical mechanicsPhysicsMathematical physicsMathematical optimizationVisual artsQuantum mechanicsArtGeometryMusicalGauge symmetryGauge theoryDynamics and Control of Mechanical SystemsControl and Stability of Dynamical SystemsModel Reduction and Neural Networks
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