Position Operator

It is a Continuous Operator that represents the position of a particle In the position basis:

(x^ψ)(x)xψ(x)(\hat{x}\psi)(x)\rightarrow x\psi(x)

Note that

x^=xxxdx\hat{x}=\int x\ket{x}\bra{x}dx

check:

x^x=xxxxdx\hat{x}\ket{x} = \int x'\,\ket{x'}\braket{x'|x}\, dx'

This uses the principle in the first note of Dirac Delta

=xxδ(xx)dx= \int x'\,\ket{x'}\,\delta(x'-x)\, dx'

Because this only fires at x=xx'=x, we're only going to evaluate xxx'\ket{x'} at xx. Hence

=xx=x\ket{x}

Properties

  1. Note
f(x^)x=f(x)xf(\hat{x})\ket{x} = f(x)\ket{x}
  1. Note
xf(x^)=f(x)x\bra{x}f(\hat{x}) = f(x)\bra{x}
  1. Note
ψf(x^)ψ=f(x)ψ(x)2dx=f(x)Pψ(x)dx\bra{\psi}f(\hat{x})\ket{\psi} = \int f(x)\,|\psi(x)|^2\, dx = \int f(x)\,P_\psi(x)\, dx
  1. Note
xx^ψ=xxψ=xψ(x)\bra{x}\hat{x}\ket{\psi} = x\braket{x|\psi} = x\,\psi(x)