Handbook of Photovoltaic Science and Engineering

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Photovoltaic science and engineering (1)

3.2.3 Conduction-band and Valence-band Densities of State

Figure 3.3
A simplified energy band diagram at
T >
0 K for a direct band gap (
E
G
) semiconduc-
tor. Electrons near the maxima in valence band have been thermally excited to the empty states near
the conduction-band minima, leaving behind holes. The excited electrons and remaining holes are
the negative and positive mobile charges that give semiconductors their unique transport properties
near the bottom of the conduction band is a constant, as is the hole effective mass (
m
∗
p
)
near the top of the valence band. This is a very practical assumption that greatly simplifies
the analysis of semiconductors.
When the minimum of the conduction band occurs at the same value of the crystal
momentum as the maximum of the valence band, as it does in Figure 3.3, the semicon-
ductor is a
direct band gap
semiconductor. When they do not align, the semiconductor
is said to be an
indirect band gap
semiconductor. This is especially important when the
absorption of light by a semiconductor is considered later in this chapter.
Even amorphous materials exhibit a similar band structure. Over short distances,
the atoms are arranged in a periodic manner and an electron wave function can be defined.
The wave functions from these small regions overlap in such a way that a
mobility gap
can be defined with electrons above the mobility gap defining the conduction band and
holes below the gap defining the valence band. Unlike crystalline materials, however,
there are a large number of localized energy states within the mobility gap (band tails and
dangling bonds) that complicate the analysis of devices fabricated from these materials.
Amorphous silicon (a-Si) solar cells are discussed in Chapter 12.
3.2.3 Conduction-band and Valence-band Densities of State
Now that the dynamics of the electron motion in a semiconductor has been approximated
by a negatively charged particle with mass
m
∗
n
in the conduction band and by a positively
charged particle with mass
m
∗
p
in the valence band, it is possible to calculate the density

FUNDAMENTAL PROPERTIES OF SEMICONDUCTORS
67
of states in each band. This again involves solving the time-independent Schr¨odinger
equation for the wave function of a particle in a box, but in this case the box is empty. All
the complexities of the periodic potentials of the component atoms have been incorporated
into the effective mass. The density of states in the conduction band is given by
g
C
(E)
=
m
∗
n
2
m
∗
n
(E
−
E
C
)
π
2
¯
h
3
cm
−
3
eV
−
1
(
3
.
7
)
while the density of states in the valence band is given by
g
V
(E)
=
m
∗
p
2
m
∗
p
(E
V
−
E)
π
2
¯
h
3
cm
−
3
eV
−
1
(
3
.
8
)

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