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Postulates of Quantum Mechanics
(from “quantum mechanics” by Claude Cohen-Tannoudji)
nd Q
2 postulate: Every measurable physical quantity
is described by an operator ˆ This operator is an observable.
Q.
3rd postulate: The only possible result of the
measurement of a physical quantity Q is one of the eigenvalues
€ ˆ
of the corresponding Q .
€
observable
4th postulate (non-degenerate): When the physical quantity Q
€ ψ
is measured on a system in the normalized state the probability of
a € ˆ
obtaining the eigenvalue n of the corresponding Q is
2 observable ˆ
P a = u ψ where u is the normalized eigenvector of Q
( n) n n €
associated with the eigenvalue a .
€ n
€ €
€ € €
€
Physical interpretation of ψ
2 *
ψ =ψψ is a probability density. The probability of
finding the particle in the volume element dxdydz at time t is
€ 2
ψ(x,y,z,t) dxdydz.
€
€ €
General solution for ψ(x,y,z,t)
€ ψ(x,y,z,t) =ψ (x,y,z)θ (t)
Try separation of variables: n n
Plug into TDSE to arrive at the pair of linked equations:
€ −iE t/h
θ t =e n € ˆ
n( ) and H ψ = E ψ
n n n
€ €
Orthogonality:
ψ ,ψ Hψ =Eψ
For a b which are different eigenvectors of n n n
*
we have orthogonality: ψψ =0
∫
a b
€ €
Let us prove this to introduce the bra/ket
notation used in the textbook
€
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