I. INTRODUCTION
The GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayer is of considerable importance today,
because of its wide application in the optoelectronics device (1-3), and there have been many studies of its physical properties (4-6). Such studies are important because a proper understanding of the material characteristics
underlies all applications. It is well known that the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayer is grown as a pseudomorphic layer on top of a GaAs buffer, the sizeable reduction
of the lattice parameter of GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ due to nitrogen
incorporation results in the development of a tensile strain (7-9). The strain causes a phonon frequencies shift, valence-band splitting and an increase
or decrease in the band gap under a compressive or tensile strain, respectively (10,11).
Raman spectra are valuable tools for characterizing the lattice vibrational properties
of bulk semiconductors and epilayer systems. Once the phonons in an alloy system have
been characterized, Raman spectroscopy can be used, for example, to evaluate the alloy
strain in a given situation from measurements of the optical phonon frequencies. Raman
scattering has distinct advantages in many cases, as it may be universally applied
to thin alloy epilayers such as quantum wells or to quantum wires and dots. There
have been many Raman investigations of the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ semiconductor
alloy, principally in the form of strained epilayers grown on GaAs. Valence-band splitting
in GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ are also reported (12,13), but a theoretical analysis of these phenomena has not been carried out. Accordingly,
detailed theoretical calculations of tensile strain effects in strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers are necessary and important. The fundamental band gap, valence-band splitting
and spin-orbit splitting of GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ at various temperatures
are measured by photoreflectance spectroscopy (14). For photocurrent spectra, the low energy cut-off of the photocurrent spectra was
determined by using the band gap or the absorption edge of the semiconductor (15). A low energy cut-off was also observed in the photocurrent spectra characteristics
because at low energy, the value of the absorption coefficient is very large in semiconductors
and all the incident optical absorption is near the surface. The photocurrent spectra
peaks are dominated by an intense band to band transition that is attributed to optical
transition of the valance band electrons (15). Therefore, by measuring the photocurrent spectra peaks we can distinguish between
the exciting transitions involving light or heavy hole band in the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayer. Thus, analysis of photocurrent spectra peaks shows that the light- and heavy-hole
of valence-band in strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayer grown on
GaAs substrates are split at the Г point, with the valence-band of light- and heavy-hole,
induced by tensile strain in GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayer. The photocurrent
spectra are found to consist of two peaks at near band edge whose splitting increase
with increasing nitrogen composition.
In this paper, we analyze the effect exerted by strain on the phonon and the valence-band
splitting in strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers grown on GaAs
(100) substrates, using Raman and photocurrent spectra measurements. In addition,
the composition was determined by using high-resolution X-ray diffraction (HR-XRD)
and Vegard’s rule. All epilayers exhibit coherent tensile strain on the GaAs buffer
layer. The Raman spectra are observed to be dominated by the GaAs-like longitudinal
optical (LO) phonon mode as the strongest peaks show up around 289~294 cm$^{-1}$.
Moreover, the weak and broad peaks features in the range of 255~276 cm$^{-1}$ originate
from the peaks of GaAs-like transverse optical (TO) phonon mode and disorder induced,
GaN-like LO. The fundamental band gap and valence-band splitting of GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
at various temperatures are obtained by photocurrent spectra. The photocurrent spectra
show the valence-band splitting peaks, and the valence-band splitting increase with
increasing nitrogen composition in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayer.
III. Results and Discussion
The nitrogen composition in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
was determined from X-ray diffraction and Vegard's rule. Fig. 1 shows the HRXRD rocking curves for a set of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with different nitrogen compositions in the range 0.29<x<0.61. The well-defined
diffraction peaks are regular with the growth of single-phase GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
strained layers. With nitrogen composition increasing, the diffraction peak corresponding
to GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ strained layer shifts away from the GaAs
substrate peak, which can be expected from the increasing lattice mismatch strain.
GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ strained layers are under tensile strain on
GaAs substrates. If tetragonal alteration is assumed, the lattice parameters perpendicular
and parallel to the interface, a$_{\mathrm{┴}}$ and a$_{\mathrm{{\|}}}$, respectively,
are determined by the symmetric (004) HRXRD rocking curves. a$_{\mathrm{{\|}}}$ is
found to be in good agreement with the lattice constant of GaAs, and it was verified
that all of the samples were grown as fully relaxed layer. The lattice constant of
the relaxed GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ lattice, a$_{0}$, is calculated
giving to (16,17)
Fig. 1. HR-XRD (004) rocking curves of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with of four different nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and
0.61 %.
where C$_{11}$ and C$_{12}$ are the elastic constants of GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$,
which are taken as the nitrogen compositions of weighted mean values between the values
of GaAs and β-GaN. The elastic constants for GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
are calculated from the nitrogen composition using C$_{11}$ = 29.6${\times}$10$^{11}$,
C$_{12}$ = 1.54${\times}$10$^{11}$ dyn/cm$^{2}$ for β-GaN and C$_{11}$ = 11.883${\times}$10$^{11}$,
C$_{12}$ = 5.383${\times}$10$^{11}$ dyn/ cm$^{2}$ for GaAs. The strain in the growth
direction in the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ strained layer on GaAs substrate
is obtained as
Also the in-plane strain in the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ strained layer
is obtained as
Because a GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ strained layer grown on a GaAs (001)
substrate is under biaxial stress, the in-plane strain $ε_{\parallel }$ is related
to $ε_{\bot }$ by
The nitrogen composition is determined assuming Vegard's rule,
where a$_{\mathrm{GaAs}}$ and a$_{\mathrm{β-GaN}}$ are the lattice constant of GaAs
and β-GaN, respectively, ${\theta}$$_{GaAsN}$ is the lattice bowing parameter and
calculated to be equal to -20.95Å (17). From the standard (004) ${ω}$ scans shown in Fig. 1, Bragg’s law can be used quite easily to extract the in-plane lattice constants from
the angular position $ω _{\text{GaAsN}}^{004}$ of the peak associated with the strained
GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers (15). From the measured peak positions, the in-plane lattice constants are evaluated to
be 5.62 Å, 5.61 Å, 5.60 Å and 5.58 Å, respectively, which are corresponding to the
strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers for various nitrogen compositions
of 0.29 %, 0.36 %, 0.48 % and 0.61 %. Those constants are also corresponding to in-plane
tensile strains of 0.057 %, 0.071%, 0.094% and 0.119%, respectively. The in-plane
tensile strain of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers increases
as nitrogen composition increases.
The room-temperature Raman spectra were measured using a pumped solid-state laser
unit of 532 nm to determine the strain percentage of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers. The spectra were taken at room temperature in a (001) backscattering geometry
for the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers with various nitrogen
compositions. Fig. 2 shows the Raman spectra of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %. As can be
seen from Fig. 2, the Raman peak shifts toward lower wave number with increasing nitrogen compositions,
which is indicates the presence of tensile strain in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers.
The Raman spectra of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
are observed to be dominated by the longitudinal optical (LO) phonon mode as the strongest
peaks show up around 289~294 cm$^{-1}$. Moreover, the broad and weak spectral features
in the range of 255~276 cm$^{-1}$ originate from the signals of transverse optical
(TO) phonon mode, which is consistent with the observation of a disorder-activated
transverse optical (DATO) phonon mode. The weak, broad feature located at ~235 cm$^{-1}$
can be assigned to the GaN-like LO mode, with possibly some small contribution of
the forbidden GaN-like TO mode (18). These two modes cannot be corrected because they are very close in frequency, as
occurs in strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers for similar nitrogen
compositions. On the other hand, the GaAs (LO) phonon peaks of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %
appear at 293.08, 292.34, 290.78, and 289.11 cm$^{{-}1}$, respectively. The observed
lower wave number shift in the phonon peak signifies that the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers are under tensile strain and nitrogen composition.
In theory, the measured shift of the GaAs(LO) peak can be expressed as
For biaxial strain, the magnitude of $Δω_{\mathrm{strain}}$ in Eq (6) depends linearly on the in-plane strain ${ε}$$_{\mathrm{{\|}}}$ as it follows the
relationship (19)
Fig. 2. Raman spectra of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
with of four different nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %.
where ${ω}$$_{0}$ is the unstrained Raman frequency, C$_{11}$ and C$_{12}$ are elastic
constants, and p and q are phonon deformation parameters. The magnitude of $Δω_{\mathrm{alloy}}$
depends linearly on the nitrogen composition x as it follows the relationship
Fig. 3. Nitrogen compositions dependence of strain of four strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %,
the strain was measured determined HR-XRD and Raman spectroscopy.
The in-plane tensile strain in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayer is calculated from the strain versus Raman spectral peak shift ($Δω_{\mathrm{strain}}$
= ${ω}$$_{\mathrm{layer}}$ − ${ω}$$_{\mathrm{wafer}}$) relative to the GaAs wafer.
The equation can be simplified to $Δω_{\mathrm{strain}}$ = $bε_{∥}$, where $ε_{∥}$
is the tensile strain and b} = ${-}$ (62.7${\pm}$40) cm$^{-1}$ (19). The strain contribution $Δω_{\mathrm{strain}}$ has to be deduced from the total
Raman shift in order to determine the nitrogen composition dependence of the Raman
shift. The Raman shift of relaxed GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ alloys, $Δω_{\mathrm{alloy}}$,
can be easily calculated by using Eq (8), where a = ${-}$ (7.54${\pm}$4.0) cm$^{-1}$ (19). The Raman shift of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers, $Δω_{\mathrm{alloy}}$,
with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 % are evaluated
to be 0.021, 0.027, 0.036 and 0.045 cm$^{{-}1}$, respectively. The estimated value
of the Raman shift for strain of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
for various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 % are 293.08,
292.34, 290.78, and 289.11 cm$^{{-}1}$, respectively. With Eq (7), the in-plane tensile strains of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
for various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 % are of 0.056
%, 0.067%, 0.092% and 0.119%, respectively. This result shows that the in-plane tensile
strain of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers increases as
the nitrogen composition increases. Fig. 3 show the nitrogen compositions dependence of strain of four strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %,
the strain was measured determined HR-XRD and Raman spectroscopy.
Fig. 4. Temperature dependence of the photocurrent spectra of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with of four different nitrogen compositions of (a) 0.29 %, (b) 0.36 %,
(c) 0.48 %, (d) 0.61 %.
The temperature dependences of the photocurrent spectra of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with various nitrogen compositions were measured at temperatures ranging
from 300 to 30 K. Fig. 4 show the temperature dependence of photocurrent spectra of four strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with various nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and 0.61 %.
The wavelength ranges from 600-1100 nm. The photocurrent spectra are dominated by
the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$-related transitions and the GaAs related
band edge photocurrent peak seems to be completely dependent on the temperature, as
can be clearly seen in Fig. 4. The GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$-related transition photocurrent spectra
peaks are found to consist of two bands whose valence-band splitting increase with
increasing nitrogen composition. The two features near the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$-related
transition photocurrent peaks in the low-energy peak of the photocurrent spectra of
the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers are related to the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
fundamental energy gap. Epitaxial GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
grown on (100) GaAs substrate are under tensile strain. The doublet is the photocurrent
peaks of the strained status of the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers.
We assign the first and the second photocurrent spectra peaks to the split light-hole(E$_{\mathrm{LH}}$)
and heavy-hole (E$_{\mathrm{HH}}$) transitions in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers (21), respectively. This analysis provides us with fine information about the strain status
and the composition of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers.
The energy gaps associated with the transitions from E$_{\mathrm{HH}}$ and E$_{\mathrm{LH}}$
of valence bands to the conduction band, as well as the valence band splitting ${Δ}$E=E$_{\mathrm{HH}}$
- E$_{\mathrm{LH}}$, can be related to the in-plane strain.
Fig. 4 shows that the photocurrent peak wavelength was red shifted as increasing temperature
due to the decreased band gap of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers.
All of the photocurrent spectra peaks are dominated by an intense optical band to
band transition that is originated to transition of the valance band electrons. For
photocurrent spectra, the low photon energy cut-off of the response spectra was determined
by using the band gap energy or the absorption edge of the semiconductor. A low photon
energy cut-off was also observed in the response spectra characteristics because at
low photon energy, the value of the absorption appear very large in semiconductors
and all the incident optical band gap energy is absorbed near the surface. The photocurrent
spectra show the valence band splitting peaks at low temperature and their peaks are
red-shifted with increasing temperature.
Fig. 5. Temperature dependence of the photocurrent peak energies of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with of four different nitrogen compositions of 0.29 %, 0.36 %, 0.48 % and
0.61 %.
Fig. 6. Measured valence band splitting ${Δ}$E=E$_{\mathrm{HH}}$ - E$_{\mathrm{LH}}$
of strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers versus nitrogen composition
dependence.
Fig. 5 summarizes the temperature dependence of the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$-related
transition photocurrent peaks (E$_{\mathrm{LH}}$ and E$_{\mathrm{HH}}$) energies of
the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers with various nitrogen
compositions. The temperature dependence of the direct energy band gap can be described
by the Bose−Einstein expression proposed by Lautenschlager et al. (22) or the Varshni equation (23). The Varshni relation, E$_{\mathrm{g}}$(T) = E$_{0}$ - αT$^{2}$/(β + T), and the
Bose−Einstein expression, E$_{\mathrm{g}}$(T) = E$_{\mathrm{B}}$ − a/[exp(θ/T) - 1],
have been used to explain the temperature dependence of the fundamental band gap in
semiconductors. E$_{\mathrm{g}}$ and E$_{\mathrm{B}}$ are the band gaps at T = 0 K
while α and β are the Varshni coefficients. a is the electron-average phonon coupling
constant, and θ corresponds to the average phonon temperature. Both expressions give
similarly good fits to the measured E$_{\mathrm{g}}$(T) in GaAs. The parameters fitted
for GaAs are E$_{0}$ = 1.519 eV, α = 5.405 ⅹ 10$^{-4}$ eV/K, and β = 204 K, and for
GaN, E$_{0}$ = 3.512 eV, α = 5.66 ⅹ 10$^{-4}$ eV/K, and β = 737.9 K in the Varshni
relation. For our experimental result, the temperature dependence of the GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$-related
transition photocurrent peaks (E$_{\mathrm{LH}}$ and E$_{\mathrm{HH}}$) energies of
the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayer can be described by using
Varshni’s empirical expression. As shown in the Fig. 5, the solid lines are fits of the Varshni equations of the measured data for GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
strained layers with nitrogen composition of 0.29 %, 0.36 %, 0.48 % and 0.61 %, respectively.
The fitted parameters for the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers
with nitrogen composition show the expected trend of decreasing E$_{0}$, α and β as
increasing nitrogen composition. For the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$
epilayers with nitrogen composition increase as shown in the Fig. 4 and 5, we observe a significant valence band heavy-holes to conduction and valence band
light-holes to conduction transitions due to the strain-induced valence band splitting
in the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers and due to the lattice
mismatch to GaAs substrate. These photocurrent spectra with increasing nitrogen composition,
the dominant valence band splitting ${Δ}$E=E$_{\mathrm{HH}}$ - E$_{\mathrm{LH}}$ to
the increasing. The measured valence band splitting ${Δ}$E=E$_{\mathrm{HH}}$ - E$_{\mathrm{LH}}$
of the strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers versus nitrogen composition
dependence are shown in Fig. 6. As shown in the Fig. 6, the solid lines are fit the valence band splitting (${Δ}$E) of the measured data
for strained GaAs$_{\mathrm{1-x}}$N$_{\mathrm{x}}$ epilayers with nitrogen composition
and temperature dependence. The tensile strain is accompanied by splitting of light-
and heavy-hole bands as the content of nitrogen composition increases to become 26.1
meV at x=0.61%.