Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

19.2 PHYSICAL EXAMPLES OF OPERATORS


other set of four operators with the same commutation structure would result


in the same eigenvalue spectrum. In fact, quantum mechanically, orbital angular


momentum is restricted to cases in whichnis even and sois an integer; this


is in accord with the requirement placed onif solutions to∇^2 ψ=f(r)thatare


finite on the polar axis are to be obtained. The non-classical notion of internal


angular momentum (spin) for a particle provides a set of operators that are able


to take both integral and half-integral multiples ofas their eigenvalues.


We have already seen that, for a state|, m〉that has az-component of

angular momentumm, the stateU|, m〉is one with itsz-component of angular


momentum equal to (m+1). But the new state ket vector so produced is not


necessarily normalised so as to make〈, m+1|, m+1〉= 1. We will conclude


this discussion of angular momentum by calculating the coefficientsμmandνmin


the equations


U|, m〉=μm|, m+1〉 and D|, m〉=νm|, m− 1 〉

on the basis that〈, r|, r〉= 1 for allandr.


To do so, we consider the inner productI=〈, m|DU|, m〉, evaluated in two

different ways. We have already noted thatUandDare Hermitian conjugates


and soIcanbewrittenas


I=〈, m|U†U|, m〉=μ∗m〈, m|, m〉μm=|μm|^2.

But, using equation (19.31), it can also be expressed as


I=〈, m|L^2 −L^2 z−Lz|, m〉

=〈, m|(+1)^2 −m^2 ^2 −m^2 |, m〉

=[(+1)^2 −m^2 ^2 −m^2 ]〈, m|, m〉

=[(+1)−m(m+1)]^2.

Thus we are required to have


|μm|^2 =[(+1)−m(m+1)]^2 ,

but can choose that allμmare real and non-negative (recall that|m|≤). A


similar calculation can be used to calculateνm. The results are summarised in the


equations


U|, m〉=


(+1)−m(m+1)|, m+1〉, (19.34)

D|, m〉=


(+1)−m(m−1)|, m− 1 〉. (19.35)

It can easily be checked thatU|, 〉=|∅〉=D|,−〉.

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