Proof: Operators with same expectation value

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FaradayCage
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Given some state [itex]\left|\psi\right\rangle[/itex], and two operators [itex]\hat{A}[/itex] and [itex]\hat{B}[/itex], how do you prove that if [itex]\langle\psi|\hat{A}|\psi\rangle = \langle\psi|\hat{B}| \psi\rangle[/itex] then [itex]\hat{A} = \hat{B}[/itex] ?
 
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FaradayCage said:
Given some state [itex]\left|\psi\right\rangle[/itex], and two operators [itex]\hat{A}[/itex] and [itex]\hat{B}[/itex], how do you prove that if [itex]\langle\psi|\hat{A}|\psi\rangle = \langle\psi|\hat{B}| \psi\rangle[/itex] then [itex]\hat{A} = \hat{B}[/itex] ?

Proving [tex]\hat{A}[/tex] is the same as [tex]\hat{B}[/tex] depends on the state of [tex]\psi[/tex]. You've made some notation [tex]<\psi|\psi>[/tex] is a probability amplitude. Your operators are fine, but if they are equal, it depends on the state of [tex]|\psi>[/tex]. Note though [tex]\mathcal{O} \cdot x \ne x \cdot \mathcal{O}[/tex].
 
FaradayCage said:
Given some state [itex]\left|\psi\right\rangle[/itex], and two operators [itex]\hat{A}[/itex] and [itex]\hat{B}[/itex], how do you prove that if [itex]\langle\psi|\hat{A}|\psi\rangle = \langle\psi|\hat{B}| \psi\rangle[/itex] then [itex]\hat{A} = \hat{B}[/itex] ?

Well, you can't; you have the equality of the images for only one vector in the common domain. You must have much more than that, of course.