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In classical mechanics we have momentum as generator of translation by following definition:

$$f(x+\delta x)=f(x)+[f(x),p]\delta x+....$$

I was wondering whether using this relation and commutation relation between $\hat{x}$ and $\hat{p}$ can we come to a quantum mechanic relation of momentum as generators:

$$\left(1-\frac{i}{\hbar}\hat{p}dx\right)|x\rangle=|x+dx\rangle $$

I am preferring to use commutation relationships as they are the bridge between quantum mechanics and classical mechanics.

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marked as duplicate by ACuriousMind, Kyle Kanos, Brandon Enright, user10851, Qmechanic Aug 2 '14 at 20:04

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  • $\begingroup$ I got the answer....The first equation indeed find its place in Quantum mechanics for observables in Heisenberg's picture where also it treats momentum as generator of translation..this what my concern was. $\endgroup$ – Vishal Pathak Aug 3 '14 at 13:39