Mathematical Methods for Physics and Engineering : A Comprehensive Guide

19.2 PHYSICAL EXAMPLES OF OPERATORS

In the second line, we have moved expectation values, which are purely numbers,

out of the inner products and used the normalisation condition〈ψ|ψ〉=1.

Similarly

〈v|u〉=−i〈ψ|BA|ψ〉+iE[A]E[B].

Adding these two results gives

〈u|v〉+〈v|u〉=i〈ψ|AB−BA|ψ〉,

and substitution into (19.36) yields

0 ≤(i〈ψ|AB−BA|ψ〉)^2 ≤4(∆A)^2 (∆B)^2

At first sight, the middle term of this inequality might appear to be negative, but

this is not so. SinceAandBare Hermitian,AB−BAis anti-Hermitian, as is easily

demonstrated. Sinceiis also anti-Hermitian, the quantity in the parentheses in

the middle term is real and its square non-negative. Rearranging the equation and

expressing it in terms of the commutator ofAandBgives the generalised form

of theUncertainty Principle. For any particular state|ψ〉of a system, this provides

the quantitative relationship between the minimum value that the product of the

uncertainties inAandBcan have and the expectation value, in that state, of

their commutator,

(∆A)^2 (∆B)^2 ≥^14 |〈ψ|[A, B]|ψ〉|^2. (19.38)

Immediate observations include the following:

(i) IfAandBcommute there is no absolute restriction on the accuracy with

which the corresponding physical quantities may be known. That is not to

say that ∆Aand ∆Bwill always be zero, only that they may be.

(ii) If the commutator ofAandBis a constant,k= 0, then the RHS of

equation (19.38) is necessarily equal to^14 |k|^2 , whatever the form of|ψ〉,

and it is not possible to have ∆A=∆B=0.

(iii) Since the RHS depends upon|ψ〉, it is possible, even for two operators

that do not commute, for the lower limit of (∆A)^2 (∆B)^2 to be zero. This

will occur if the commutator[A, B]is itself an operator whose expectation

value in the particular state|ψ〉happens to be zero.

To illustrate the third of these, we might consider the components of angular

momentum discussed in the previous subsection. There, in equation (19.27), we

found that the commutator of the operators corresponding to thex-andy-

components of angular momentum is non-zero; in fact, it has the valuei
Lz.

This means that if the state|ψ〉of a system happened to be such that〈ψ|Lz|ψ〉=0,

as it would if, for example, it were the eigenstate ofLz,|ψ〉=|, 0 〉, then there

would be no fundamental reason why the physical values of bothLxandLy

should not be known exactly. Indeed, if the state were spherically symmetric, and