Physical Chemistry Third Edition

(C. Jardin) #1

920 22 Translational, Rotational, and Vibrational States of Atoms and Molecules


Appendix E and was applied to the hydrogen atom in Chapter 17. We relabel the
center-of-mass term as the translational term,Ĥtr:

ĤnucĤc+ĤrelĤtr+Ĥrel (22.2-5)

̂Htr−h ̄

2
2 M

∇c^2 +Vext(xc,yc,zc) (22.2-6)

Ĥrel−h ̄

2
2 μ

∇^2 +V(r) (22.2-7)

where we now drop the subscript AB on the internuclear distance. The sum of the
masses of the two nuclei is denoted byMand their reduced mass is denoted byμ:

MmA+mB (22.2-8)

μ

mAmB
mA+mB

(22.2-9)

We neglect the mass of the electrons compared with the nuclei and considerMto
the mass of the entire molecule. The operator∇c^2 is the Laplacian operator for the
center-of-mass coordinates and the operator∇is the Laplacian operator for the relative
coordinates. Thexcoordinate of the center of mass is

xc

mAxA+mBxB
M

(22.2-10)

and the relativexcoordinate is

xxB−xA (22.2-11)

Theyandzcoordinates are similarly defined.
Since the Hamiltonian operator in Eq. (22.2-5) contains the two terms in Eq. (22.2-6)
and Eq. (22.2-7) it can be solved by the separation of variables, yielding one Schrödinger
equation for̂Htrand one Schrödinger equation for̂Hrel. We assume that the molecule
is contained in a rectangular box. The Schrödinger equation for̂Htris like that of a
structureless particle in the box, and the particle-in-a-box energy wave functions and
the particle-in-a-box energy eigenvalues from Chapter 15 can be used. We now focus
on the Schrödinger equation for̂Hrel, which can be solved by a second separation of
variables in the same way as was done for the hydrogen atom.
The relative HamiltonianĤrelgives the same Schrödinger equation as in Eq. (17.2-2)
since that equation applies to any two-body system in whichV depends only onr.
We now omit the subscript AB onr. This equation is solved by the trial function of
Eq. (17.2-3):

ψrel(r,θ,φ)R(r)Y(θ,φ) (22.2-12)

TheYfactor represents the same spherical harmonic functions as in Chapter 17, which
are eigenfunctions of̂L^2 , the operator for the square of the angular momentum. Sub-
stitution ofψrelR(r)Y(θ,φ) into the time-independent Schrödinger equation and
division byR(r)Y(θ,φ) gives Eq. (17.2-5):


1

R

d
dr

(

r^2

dR
dr

)

+

2 μr^2
h ̄^2

(V−Erel)+

1

h ̄^2

1

Y

̂L^2 Y 0 (22.2-13)

To solve this equation for the nuclear motion of a diatomic molecule, we must have a
representation of the potential energy functionV(r).
Free download pdf