Expectation value (quantum mechanics): Difference between revisions

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Added mention that not only is expectation value not "most probable" but it may have 0 probability of ever occuring.
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The '''Levy–Mises equations''' (also called '''flow rules''') describe the relationship between [[Shear stress|stress]] and [[Strain (materials science)|strain]] for an ideal [[Plasticity (physics)|plastic]] [[solid]] where the [[Elasticity (physics)|elastic]] strains are negligible.
 
The generalized Levy–Mises equation can be written as:
 
: <math>\frac{\mathbf{d}\varepsilon_1}{\sigma'_1}=\frac{\mathbf{d}\varepsilon_2}
{\sigma'_2}=\frac{\mathbf{d}\varepsilon_3}{\sigma'_3}=\mathbf{d}\lambda</math>
 
{{DEFAULTSORT:Levy-Mises equations}}
[[Category:Materials science]]
[[Category:Continuum mechanics]]
[[Category:Solid mechanics]]
 
 
{{mathapplied-stub}}

Revision as of 00:41, 3 February 2014

The Levy–Mises equations (also called flow rules) describe the relationship between stress and strain for an ideal plastic solid where the elastic strains are negligible.

The generalized Levy–Mises equation can be written as:

dε1σ'1=dε2σ'2=dε3σ'3=dλ


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