Mathematical Methods for Physics and Engineering : A Comprehensive Guide

QUANTUM OPERATORS

operate repeatedly on it with the (down) ladder operatorD, we will generate a

state|ψd〉which, whilst still an eigenstate ofL^2 with eigenvaluea,hasthelowest

physically possible value,dsay, for the eigenvalue ofLz. If this happens aftern

operations we will have thatd=c−nand

Lz|ψd〉=(c−n)|ψd〉.

Arguing in the same way as previously thatD|ψd〉must be an unphysical ket

vector, we conclude that

0 |∅〉=U|∅〉=UD|ψd〉

=(L^2 −L^2 z+Lz)|ψd〉, using (19.30),

=[a−(c−n)^2 +(c−n)]|ψd〉 ⇒ a=(c−n)^2 −(c−n).

Equating the two results foragives

c^2 +c=c^2 − 2 cn+n^2 ^2 −c+n^2 ,

2 c(n+1)=n(n+1),

c=^12 n.

Sincenis necessarily integral,cis an integer multiple of^12 . This result is valid

irrespective of which eigenstate|ψ〉we started with, though the actual value of

the integerndepends on|ψu〉and hence upon|ψ〉.

Denoting^12 nbywe can say that the possible eigenvalues of the operator

Lz, and hence the possible results of a measurement of thez-component of the

angular momentum of a system, are given by

, (−1), (−2), ... , −.

The value ofafor all 2+ 1 of the corresponding states,

|ψu〉,D|ψu〉,D^2 |ψu〉, ... , D^2 |ψu〉,

is(+1)^2.

The similarity of form between this eigenvalue and that appearing in Legendre’s

equation is not an accident. It is intimately connected with the facts (i) thatL^2

is a measure of the rotational kinetic energy of a particle in a system centred

on the origin, and (ii) that in spherical polar coordinatesL^2 has the same form

as the angle-dependent part of∇^2 , which, as we have seen, is itself proportional

to the quantum-mechanical kinetic energy operator. Legendre’s equation and

the associated Legendre equation arise naturally when∇^2 ψ=f(r)issolvedin

spherical polar coordinates using the method of separation of variables discussed

in chapter 21.

The derivation of the eigenvalues(+1)^2 andm, with−≤m≤, depends

only on the commutation relationships between the corresponding operators. Any