c17 JWBS043-Rogers September 13, 2010 11:28 Printer Name: Yet to Come
A VARIATIONAL TREATMENT FOR THE HYDROGEN ATOM 271
The same problem for a sum ofNterms demands that the general secular deter-
minant be zero. This leads toNroots:
∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣
H 11 −ES 11 H 12 −ES 12 ... H 1 N−ES 1 N
H 21 −ES 21 H 22 −ES 22 ... H 2 N−ES 2 N
..
.
..
. ...
..
.
HN 1 −ESN 1 HN 2 −ESN 2 ... HNN−ESNN
∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣
= 0
Many readers will be familiar with the use of this mathematical formalism in Huckel ̈
molecular orbital theory.
17.3 A VARIATIONAL TREATMENT FOR THE HYDROGEN ATOM:
THE ENERGY SPECTRUM
Starting with the radial Hamiltonian
Hˆ =
(
−^12 ∇ 12 −
2
r 1
)
=−
1
2 r^2
d
dr
r^2
d
dr
−
2
r
and the exact wave function for the hydrogen atomφ(r)=e−αr, the variational
method leads to
E=
h^2 α^2
8 π^2 me
−αe^2
wheremeis the mass of the electron (McQuarrie, 1983). This result is similar to
the exact solution for the particle in a cubic boxE=h^2 n^2 / 8 ml^2 except that there
is a potential energy term−αe^2. We can expect some similarities between the two
systems. One similarity is that in each there is aspectrumof specific energy levels,
each corresponding to a specific quantum number. Another is that there is no zero
energy because the lowest quantum number is 1, not 0.
We would like to carry out a systematic search for the minimum energy, so we
set the first derivative ofEwith respect toαequal to zero. The derivative goes to
zero at a minimum, maximum, or inflection point. If our trial function is reasonably
good,^1 only the minimum is found at this level of calculation. (For more complicated
systems, maxima, saddle points, and the like may be found.)
The derivative is
dE
dα
=
2 ^2 α
me
−e^2 = 0
(^1) As chemists, we bring centuries of empirical evidence to bear on the decision of what is or is not a good
atomic or molecular wave function. A negative exponential is reasonable for the hydrogen atom.