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Updated a couple headings and showed you how to do LaTeX with $$
(A attempted derivation of the Heisenberg equations of motion from non-commutative calculus of variations)
 
(Updated a couple headings and showed you how to do LaTeX with $$)
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# Non-Commutative Calculus of Variations
== Non-Commutative Calculus of Variations ==


# Non-Commutative Lagrangian Mechanics
== Non-Commutative Lagrangian Mechanics ==


A generalization of Lagrangian Mechanics to a probabilistic mechanics via not assuming that x and dx commute and using
A generalization of Lagrangian Mechanics to a probabilistic mechanics via not assuming that x and dx commute and using <!-- <a href="https://www.codecogs.com/eqnedit.php?latex=\delta&space;ExpectationValue(S)&space;=&space;0" target="_blank"><img src="https://latex.codecogs.com/gif.latex?\delta&space;ExpectationValue(S)&space;=&space;0" title="\delta ExpectationValue(S) = 0" /></a> -->


<a href="https://www.codecogs.com/eqnedit.php?latex=\delta&space;ExpectationValue(S)&space;=&space;0" target="_blank"><img src="https://latex.codecogs.com/gif.latex?\delta&space;ExpectationValue(S)&space;=&space;0" title="\delta ExpectationValue(S) = 0" /></a>
$$\delta ExpectationValue(S) = 0$$


Perhaps the equations of quantum mechanics follow?
Perhaps the equations of quantum mechanics follow?