Conservative force for an elastic force?

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mamadou
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Hi ,

I wanted to know how elastic force could be a conservative force ?
 
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I see, so it's forces that a linear to some displacement, e.g., a spring in the linear realm, where Hook's Law is valid, i.e., for the elongation in ##x## direction, ##\vec{F}=-k x \vec{e}_x##. Then it's of course conservative since obviously a potential exists, namely
$$V(x)=\frac{k}{2} x^2 \; \Rightarrow \; \vec{F}=-\vec{\nabla} V.$$
Any force that has a potential is conservative, i.e., the energy-conservation law holds true.

Note: The other direction of this statement is not true. E.g., the magnetic force on a charge hasn't any potential (it's even velocity dependent) but still the energy-conservation law holds true!
 
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There are also nonlinear elasticity theories that hold reasonably well even for large deformations (outside linear realm). One of these is the Neo-Hookean model. The potential energy of an elastic object is some function of the displacements of its volume elements from their equilibrium positions, and is conservative unless you take in account the frictional dissipation of energy (viscoelasticity).
 
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