Antilocalization effect on photo-generated carriers in semi-insulating GaAs sample

Viana, Emilson Ribeiro; Ribeiro, Geraldo Mathias; Oliveira, Alfredo Gontijo de; Peres, Marcelos Lima; Rubinger, Rero Marques; Rubinger, Carla Patrícia Lacerda

doi:10.1590/S1516-14392012005000065

Abstract

Magnetoresistance measurements were performed on an illuminated semi-insulating GaAs sample with intrinsic deep level defects. Electrical carriers were photo-generated under light excitation and positive magnetoresistance for B < 0.2 T was observed in the whole range of temperatures measured (220-315 K). Using the model developed by H. Fukuyama and K. Hoshino, we interpreted the positive magnetoresistance as mainly caused by weak antilocalization effects over hole carriers for T > 240 K. The high disorder originated from the low temperature growth of the sample leads to the strong localization of carriers and gives rise to the positive magnetoresistance observed at temperatures as high as room temperature.

semi-insulating GaAs; deep-level defects; antilocalization

Antilocalization effect on photo-generated carriers in semi-insulating GaAs sample

Emilson Ribeiro Viana^I; Geraldo Mathias Ribeiro^I; Alfredo Gontijo de Oliveira^I; Marcelos Lima PeresII, ^* * e-mail: marcelos@unifei.edu.br ; Rero Marques Rubinger^II; Carla Patrícia Lacerda Rubinger^II

^IDepartamento de Física, ICEx, Universidade Federal de Minas Gerais - UFMG, CP 702, CEP 30123-970, Belo Horizonte, MG, Brasil

^IIInstituto de Ciências, Departamento de Física e Química, Universidade Federal de Itajubá - UNIFEI, CP 50, CEP 37500-903, Itajubá, MG, Brasil

ABSTRACT

Magnetoresistance measurements were performed on an illuminated semi-insulating GaAs sample with intrinsic deep level defects. Electrical carriers were photo-generated under light excitation and positive magnetoresistance for B < 0.2 T was observed in the whole range of temperatures measured (220-315 K). Using the model developed by H. Fukuyama and K. Hoshino, we interpreted the positive magnetoresistance as mainly caused by weak antilocalization effects over hole carriers for T > 240 K. The high disorder originated from the low temperature growth of the sample leads to the strong localization of carriers and gives rise to the positive magnetoresistance observed at temperatures as high as room temperature.

Keywords: semi-insulating GaAs, deep-level defects, antilocalization

1. Introduction

Electron transport in disordered systems has been widely studied over the past 30 years^1-3 and is a powerful tool for probing electron-electron interactions⁴ and weak localization phenomenon⁵. For 2D systems, low field positive magnetoresistance has been observed on GaAs based structures and it is attributed to the spin-orbit coupling interaction which could be originated from the electric field of the atomic nucleus or related to the particular characteristics of crystalline and band structure of the solid^6-10. Nevertheless, few studies about spin-orbit coupling interaction have been reported on 3D semiconductor thin films^6,11,12. One method to determine the strength of the spin-orbit coupling is through the weak anti-localization effect (suppression of weak localization due spin-orbit interactions)¹. One can use the models that predict the contribution to the magnetoconductivity due to this effect and obtain the inelastic and spin-orbit scattering times and verify how they respond to the change of temperature or carrier concentration^8-10.

In this work, we report on the positive magnetoresistance measured on an illuminated GaAs sample in the temperature region of 220-315 K with intrinsic deep level defects. For the temperatures higher than 240 K, the positive magnetoresistance indicates the presence of spin-orbit coupling over the hole carriers that diffuse in a highly disordered system. The disorder is originated during the growth process where the GaAs material extremely rich in intrinsic deep level defects is obtained by low temperature molecular beam epitaxy (LT- MBE) growth¹³. This material is used in applications on the development of high quality insulating substrates after applying post-growth annealing¹⁴ and there is an academic interest in the properties of the main intrinsic deep levels found in such materials, i.e., the arsenic anti-site (As_Ga), a well-known mid-gap donor¹⁴, that can be found in concentrations that reach up to 10²⁶ m^-3 as in a typical LT-MBE sample grown. In such system, the carriers can be promoted to the bands from the As_Ga at temperatures above the room temperature or generated under illumination with an infrared GaAs LED at any temperature. In darkness, the As_Ga deep levels act as recombination centers, removing most band carriers leaving only hopping conduction. Thus, in darkness, we can identify the hopping contribution to the magnetoresistive effects while under illumination we can observe the band contribution. Since the localization radius of electronic wave functions is very short (i.e., of the order of 10 Å), no magnetoresistive effects due the wave function shrinkage will be observed for magnetic fields below 1 T. As will be shown, this is confirmed by our measurements. Thus, all magnetoresistive effects reported here were obtained under illumination and consist in effects related to scattering of band carriers by randomly distribute As_Ga anti-sites. In addition, the combination/recombination process via (As_Ga) defects, subsequent to the carrier excitation, is different for electrons and holes under illumination conditions and its rate is temperature dependent. This property is also taken in account during our analysis and we found that holes are the majority carriers for the conductivity process in this sample. We analyzed the magnetoresistance curves using the model of Fukuyama and Hoshino¹⁵ considering localization/anti-localization effects and obtained the inelastic and spin-orbit scattering times as a function of the temperature. Since the quantitative description of the spin-orbit interaction in a given material is the main key for new advances in spintronics field¹⁶, we expect that our work could shed some light on the possibility of using the spin-orbit interaction for the development of room temperature spintronic devices.

2. Material and Methods

The samples were grown on (1 0 0) SI liquid encapsulated Czochralski GaAs substrates, in a RIBER 2300 MBE system. After the standard desorption procedures, a 0.21 µm thick buffer layer was grown at 610 °C under an As overpressure of 3.2 × 10^-5 Torr and 0.81 monolayer/s. After that, the substrate temperature was ramped down at 10 °C/min to the final desired temperature while growing. After reaching the set temperature of 265 °C, a 2.4 µm thick GaAs epilayer was grown. The resistivity measurements were done using indium parallel bars contacts on samples that were cut into 1 × 2 mm². The distance between the bars was 0.5 mm. This geometry was necessary in order to measure the electrical resistance in dark conditions. After depositing the contacts and attaching gold wires with a soldering station at a temperature of 250 °C the samples were not post-annealed. The measurements were carried out in the low electric field regime, i.e., in the ohmic regime that was identified from I(V) conductivity measurements, carried out from negative to positive bias, giving us a certainty about the linearity of the contact resistance in all the measured samples. We prepared at least seven pieces of the studied sample from different parts of the wafer and for a same wafer the results did not vary significantly. For carrying out the resistivity measurements, we used a Keithley automated Hall System model 7065, the standard current source and the requested meters. All contacts between the cryostat and the Hall system were done with triaxial cables in guarded mode measurements to avoid parasitic capacitance. Inside the cryostat, 2 mm diameter 50 Teflon insulated coaxial cables were used.

3. Results

The sample was illuminated by a GaAs infrared LED and the photon flux is linearly dependent on the current through the LED. Thus, for sake of simplicity, we will refer to the illumination intensity by the corresponding current from here on. In Figure 1 we present the electrical resistance R as a function of the temperature for different illumination intensities. For dark conditions, i.e., with 0 mA, R increases as the temperature decreases while under illumination it decreases below 240 K when the illumination varies from 0 mA to 10 mA. For illumination with current above 10 mA, the electrical resistance oscillates as the temperature decreases between 260 K and 240 K and starts to decrease for temperatures below 240 K. In Figure 2a we present the normalized R as a function of the magnetic field with different illumination at T = 300 K. Through this figure we observe that no magnetoresistive effect is observed in dark conditions (0 mA) (e.g. the slight oscillations have no physical meaning) while a negative magnetoresistance can be observed for illumination with current of 5 mA. For illuminations with current higher than 5 mA, the curves exhibit positive peaks followed by negative magnetoresistance as the magnetic field increases. In Figure 2b, we show the normalized R as a function of the magnetic field for different temperature values at a fixed illumination with current of 40 mA. The amplitude of the peaks increases as the temperature decreases in the region for B < 0.2 T while a parabolic behavior is observed for B > 0.4 T due to the classical orbital effect (see inset). In Figure 2b some curves were omitted in order to simplify the view.

4. Discussion

The electron-hole combination/recombination process via deep level defects is temperature dependent and its rate is different for conduction and valence bands under illumination conditions. The temperature for which R starts to decrease observed in Figure 1 could be related to the temperature dependence of the combination/recombination rates in the conduction/valence bands. For example, if the hole recombination time increases as the temperature decreases the hole remains longer in the valence band leading to an enhancement of the conductivity in that channel. This also implies that the ratio between electrons and holes is temperature dependent. In fact, n- to p-type transition is possible for illuminated GaAs samples¹⁷. In Table 1 we observe that the carriers mobility obtained when the sample is illuminated is about 0.119 m²/Vs at T = 300 K. This value is lower than the value found in the literature for electrons (~0.850 m²/Vs) and higher than the value for holes (~0.04 m²/Vs). Deriving the carriers mobility considering a multi-channel mechanism¹⁸, we found that the effective mobility decreases if the ratio p/n increases and a value of p/n = 10² would lead to the mobility values shown in Table 1. This indicates that holes are the majority carriers in this sample. In addition, using the parameters given in Rubinger et al.¹⁹, we calculate the band to impurity recombination time (τ_R) for electrons and holes taking the As_Ga defects concentration about 10²⁵ m^-3[20]. We found that the recombination time for holes is about (5-6) × 10^-9 s between 315 K and 220 K while for electrons it is about (5-12) × 10^-12 s in the same range of temperature. The elastic scattering time varies from 2.89 × 10^-13 s to 9 × 10^-13 s in the range of 315 K to 250 K. Hence, we observe that , but also that This analysis also indicates that the holes are the majority carriers for the band conduction processes in the range of temperature analyzed, i.e., the condition indicates that the carrier has time enough to diffuses through the band before recombines back to the impurity level.

Thumbnail

The positive magnetoresistance observed on Figure 2a, b in the region of low magnetic fields (B < 0.2 T), can have different origins. For insulator materials, where the hopping conduction is the main conduction mechanism, the shrinkage of the electronic wave functions caused by the application of a magnetic field could cause such positive magnetoresistance²¹. In this case, the carrier becomes more localized in a certain space region, increasing the electrical resistance as the magnetic field increases. However, no positive magnetoresistance is observed under dark conditions according to Figure 2a where the hopping conduction mechanism dominates in this sample. In addition, the magnetic length l_B (~10^-7 m) is always larger than the mean free path l that is around ~10^-8 m, in the range 220-315 K, indicating that the confinement due the magnetic field is negligible.

On the other hand, since the magnetoresistance presented in Figure 2 exists only under illumination, one can suggest that such effect could be caused by the influence of the magnetic field on the electron/hole recombination time. In fact, recombination can be spin-dependent and hence, magnetic field dependent. If the relative spins alignment is destroyed by a magnetic field, the recombination rate (1/τ_R) increases leading to an increase of the resistivity²². However, a spin-dependent conductivity change of only Δσ/s₀ ~ 0.1% has been observed at cryogenic temperatures and under the application of an external magnetic field in Si or Ge^22,23. The effect of the magnetic field on spin dependent recombination is more pronounced if the sample is illuminated by circularly polarized light²⁴. GaAsN samples illuminated by circularly polarized light can exhibit photo-conductive variations of 40%²⁵. However, such effect has not been observed in undoped GaAs samples²⁵. In addition, only 0.05% of the light applied on our sample was found to be circularly polarized which is not sufficient to cause the magnetoresistance profiles reported here.

The weak antilocalization effect is another physical phenomenon that could give rise to the positive magnetoresistance observed in Figure 2a, b. Weak localization is a quantum effect that arises from the quantum interference between the electronic wave functions moving in the same path but in opposite directions. If the electronic wave functions have the same phase, the interference is constructive leading to a spatial localization of the electrons. This effect can be observed as a negative magnetoresistance (positive magnetoconductance) if an external magnetic field is applied to the system¹. If the spin-orbit coupling in not negligible as compared to other possible interaction mechanism, the interference is destructive and the localization is suppressed leading to the effect called weak antilocalization which can be detected as a positive magnetoresistance (negative magnetoconductance)¹. In this case, experimental data can be analyzed using the Fukuyama-Hoshino model and the spin-orbit coupling strength can be obtained¹⁵.

Recently, the Fukuyama-Hoshino theory has been successfully applied to GaAs low temperature MBE layers heavily doped with Si and Be where positive and negative magnetoresistance was observed as in our case¹². Also, in Jung et al.¹², they attributed the localization effects observed at temperatures as high as room temperature to the strongly localized carriers due to the presence of deep level impurities. Under such circumstances the localization effect can be observed since the carrier mean free path is shorter than the phase relaxation length. The difference from the case presented in Jung et al.¹² to the present work is that the carriers in the sample studied here are photo-generated instead of excited from shallow donors and acceptors. According to the Fukuyama-Hoshino model, the contribution to the magnetoconductivity due to the localization effects is given by the following equation:

, where l is the mean free path, τ, τi and so are the elastic, inelastic and spin-orbit scattering times, respectively, F(x) is Kawabatas function and

According to Equation 1, the model also requires that γ < 1. This condition is well satisfied for magnetic fields up to ~0.2 T. As told before, we consider that the holes are the majority carries in the range of 220 K to 315 K. Particularly, the spin-orbit interactions are expected to be stronger in p-type materials and, in fact, this has been observed over different systems^10,26,27. This fact is due to the p-like symmetry of the states at the top of the valence⁷. In addition, the p-like symmetry of hole states ensures that they are weakly coupled to nuclear spins, which could provide long spin coherence times. For the fitting procedure, we use the quantities C, t and k as fitting parameters and plotted the experimental data presented in Figure 2b as Δσ in order to compare with the theoretical calculations.

The fitting results are presented in Figure 3a for 0 < B < 0.1 T at the temperatures of 270, 285, 295, 300 and 315 K (the number of curves was reduced in order to clarify the visualization). Through this figure, one observes that the experimental curves are well described by the theoretical model for magnetic fields below 0.1 T. It is also clear that the fitting quality reduces for temperatures below 270 K. The values of the parameters C and t are presented in Table 1 together with the carriers mobility values which were calculated considering the classical behavior at high magnetic fields (ΔR/R₀ ~ µ² B², where µ is the mobility) while the values of k did not vary considerably and were kept constant (k =0.2). In Figure 3b, we plot the temperature dependence of the t parameter presented in Table 1. According to this figure, t decreases as temperature decreases indicating that spin-orbit coupling becomes more effective than the inelastic scattering mechanism. This is in accordance with the increasing of the positive peaks observed in Figure 2a, b or the corresponding negative magnetoconductance observed in Figure 3a.

It is still possible to estimate the value of τ_so rewriting C relation as τ_so = Cτ / l². From the carriers mobility one can derive the elastic scattering time, i.e., τ = m_hm / e, where m_h is the hole effective mass (~0.5 × m₀). The mean free path can be calculated from l = v_Fτ, where mh is the hole effective mass (~0.5 × m₀). The mean free path can be calculated from l = v_Fτ, where is the Fermi velocity. Considering a parabolic approximation, the values of the carriers concentration p can be derived substituting the Fermi energy in the k relation above giving Thus, for T = 315 K and using the data presented in Table 1 we estimated t_so ~ 4.9 × 10^-11 s.

This value agrees with the already reported results for Bulk GaAs samples at room temperature²⁸ and for those obtained for GaAs quantum wells at low temperatures⁸.

5. Conclusions

We have reported on magnetoresistance measurements performed on an illuminated semi-insulating GaAs sample with intrinsic deep level defects. Positive and negative magnetoresistances were observed for B < 0.2 T in the whole range of temperatures measured (220-315 K). For T > 240 K we explain the positive magnetoresistance curves as a manifestation of the weak antilocalization effect which is a consequence of the spin-orbit coupling interaction over the hole carriers. The Fukuyama-Hoshino model gives a good description of the experimental curves according to the antilocalization theory. From the analysis, we estimated the value of the spin-orbit scattering time at room temperature and found that it is close to the values reported before for bulk and GaAs quantum wells.

Acknowledgements

The authors acknowledge the Brazilian Agencies CNPq, CAPES and FAPEMIG for financial support.

Received: September 14, 2011

Revised: April 6, 2012

1. Bergmann G. Weak Localization in Thin Films. Physics Reports. 1984; 107(1):1-58. http://dx.doi.org/10.1016/0370-1573(84)90103-0
2. Lin BJF, Paalanen MA, Gossard AC and Tsui DC. Weak localization of two-dimensional electrons in GaAs-AlGa1-As heterostructures. Physical Review B 1984; 29:927-934. http://dx.doi.org/10.1103/PhysRevB.29.927
3. Lin JJ and Bird JP. Recent experimental studies of electron dephasing in metal and semiconductor mesoscopic structures. Journal of Physics: Condensed Matter. 2002; 14(18):R501. http://dx.doi.org/10.1088/0953-8984/14/18/201
4. Altshuler BL, Aronov AG and Lee PA. Interaction effects in disordered fermi systems in two dimensions. Physical Review Letters 1980; 44:1288-1291. http://dx.doi.org/10.1103/PhysRevLett.44.1288
5. Anderson PW, Abrahms E and Ramakrishnan TV. Possible explanation of nonlinear conductivity in thin-film metal wires. Physical Review Letters. 1979; 43:718-720. http://dx.doi.org/10.1103/PhysRevLett.43.718
6. Gilbertson AM, Newaz AKM, Chang W-J, Bashir R, Solin SA and Cohen LF. Dimensional crossover and weak localization in a 90 nm n-GaAs thin films. Applied Physics Letters. 2009; 95:012113-6. PMid:19668705 PMCid:2723832. http://dx.doi.org/10.1063/1.3176968
7. Grbic B, Leturcq R, Ihn T, Ensslin K, Reuter D and Wieck AD. Strong spin-orbit intereactions in carbon doped p-type GaAs heterostructures. Physica E 2008; 40:2144-2146. http://dx.doi.org/10.1016/j.physe.2007.10.037
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13. Lin TC and Okumura T. Characterization of annealed low-temperature GaAs layers grown by molecular beam epitaxy with n-i-n structure. Japanese Journal of Applied Physics 1996; 35:1630-1636. http://dx.doi.org/10.1143/JJAP.35.1630
14. Jost W, Kunzer M, Kaufmann U, Kohler K, Schneider J and Alt HC. AsGa antisite defects in LT GaAs as studied by magnetic resonance and magneto-optical techniques. Semiconductor Science and Technology. 1992; 7:1386-1389. http://dx.doi.org/10.1088/0268-1242/7/11/017
15. Fukuyama H and Hoshino K. Effecto of spin-orbit interaction on magnetoresistance in the weakly localized regime of three-dimensional disordered systems. Journal of the Physical Society of Japan. 1981; 50:2131-2132. http://dx.doi.org/10.1143/JPSJ.50.2131
16. Datta S and Das B. Electronic analog of the electro-opitc modulator. Applied Physics Letters. 1990; 56:665-667. http://dx.doi.org/10.1063/1.102730
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*

e-mail:

marcelos@unifei.edu.br

Publication Dates

Publication in this collection
26 June 2012
Date of issue
Aug 2012

History

Received
14 Sept 2011
Accepted
06 Apr 2012

This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.

[1] 1. Bergmann G. Weak Localization in Thin Films. Physics Reports. 1984; 107(1):1-58. http://dx.doi.org/10.1016/0370-1573(84)90103-0

[2] 2. Lin BJF, Paalanen MA, Gossard AC and Tsui DC. Weak localization of two-dimensional electrons in GaAs-AlGa1-As heterostructures. Physical Review B 1984; 29:927-934. http://dx.doi.org/10.1103/PhysRevB.29.927

[3] 3. Lin JJ and Bird JP. Recent experimental studies of electron dephasing in metal and semiconductor mesoscopic structures. Journal of Physics: Condensed Matter. 2002; 14(18):R501. http://dx.doi.org/10.1088/0953-8984/14/18/201

[4] 4. Altshuler BL, Aronov AG and Lee PA. Interaction effects in disordered fermi systems in two dimensions. Physical Review Letters 1980; 44:1288-1291. http://dx.doi.org/10.1103/PhysRevLett.44.1288

[5] 5. Anderson PW, Abrahms E and Ramakrishnan TV. Possible explanation of nonlinear conductivity in thin-film metal wires. Physical Review Letters. 1979; 43:718-720. http://dx.doi.org/10.1103/PhysRevLett.43.718

[6] 6. Gilbertson AM, Newaz AKM, Chang W-J, Bashir R, Solin SA and Cohen LF. Dimensional crossover and weak localization in a 90 nm n-GaAs thin films. Applied Physics Letters. 2009; 95:012113-6. PMid:19668705 PMCid:2723832. http://dx.doi.org/10.1063/1.3176968

[7] 7. Grbic B, Leturcq R, Ihn T, Ensslin K, Reuter D and Wieck AD. Strong spin-orbit intereactions in carbon doped p-type GaAs heterostructures. Physica E 2008; 40:2144-2146. http://dx.doi.org/10.1016/j.physe.2007.10.037

[8] 8. Desrat W, Maude DK, Wasilewski ZR, Airey R and Hill G. Dresselhaus spin-orbit coupling in a symetric (100) GaAs quantum well. Physical Review B 2006; 74:193317-21. http://dx.doi.org/10.1103/PhysRevB.74.193317

[9] 9. Cabañas S, Schapers TH, Thillosen N, Kaluza N, Guzenko VA and Hardtdegen H. Suppression of weak antilicalization in an AlxGa1-xN/GaN two-dimensional electron gas by an in-plane magnetic field. Physical Review B 2007; 75:195329-34. http://dx.doi.org/10.1103/PhysRevB.75.195329

[10] 10. Papadakis SJ, De Poortere EP, Manoharan HC, Yau JB, Shayegan M and Lyon SA. Low-field magnetoresistance in GaAs two-dimensional holes. Physical Review B. 2002; 65:245312-9. http://dx.doi.org/10.1103/PhysRevB.65.245312

[11] 11. Look DC. Molecular beam epitaxial GaAs grown at low temperatures. Thin Solid Films. 1993; 231:61-73. http://dx.doi.org/10.1016/0040-6090(93)90703-R

[12] 12. Jung DW, Noh JP, Islam AZMT and Otsuka N. Enhanced electron-electron interaction in GaAs layers doped with high concentrations of donor and acceptor impurities. Journal of the Physical Society of Japan. 2008; 77:074721-8. http://dx.doi.org/10.1143/JPSJ.77.074721

[13] 13. Lin TC and Okumura T. Characterization of annealed low-temperature GaAs layers grown by molecular beam epitaxy with n-i-n structure. Japanese Journal of Applied Physics 1996; 35:1630-1636. http://dx.doi.org/10.1143/JJAP.35.1630

[14] 14. Jost W, Kunzer M, Kaufmann U, Kohler K, Schneider J and Alt HC. AsGa antisite defects in LT GaAs as studied by magnetic resonance and magneto-optical techniques. Semiconductor Science and Technology. 1992; 7:1386-1389. http://dx.doi.org/10.1088/0268-1242/7/11/017

[15] 15. Fukuyama H and Hoshino K. Effecto of spin-orbit interaction on magnetoresistance in the weakly localized regime of three-dimensional disordered systems. Journal of the Physical Society of Japan. 1981; 50:2131-2132. http://dx.doi.org/10.1143/JPSJ.50.2131

[16] 16. Datta S and Das B. Electronic analog of the electro-opitc modulator. Applied Physics Letters. 1990; 56:665-667. http://dx.doi.org/10.1063/1.102730

[17] 17. Da Silva MIN, De Oliveira AG, Ribeiro GM, Rubinger RM, Corrêa JA and Baeta MMV. EL2-like metastable defect and the n- to p-type transition in silicon planar-doped GaAs. Journal of Applied Physics. 1997; 82:3346-3350. http://dx.doi.org/10.1063/1.365645

[18] 18. Corrêa JAF, De Oliveira AG, Da Silva MIN, Moreira MVB, Ribeiro GM and Chacham H. Temperature dependence of the equilibrium Hall concentration in silicon planar-doped GaAs samples. Solid State Communications 1996; 98:1063-1068. http://dx.doi.org/10.1016/0038-1098(96)00146-9

[19] 19. Rubinger RM, Bezerra JC, Chagas EF, González JC, Rodrigues WN, Ribeiro GM et al. Thermally stimulated current spectroscopy on silicon planar-doped GaAs samples. Journal of Applied Physics. 1998; 84:3764-3769. http://dx.doi.org/10.1063/1.368588

[20] 20. Krambrock K, Linde M, Spaeth JM, Look DC, Bliss D and Walukiewicz W. Arsenic antisite-related defects in low-temperature MBE grown GaAs. Semiconductor Science and Technology. 1992; 7:1037-1041. http://dx.doi.org/10.1088/0268-1242/7/8/002

[21] 21. Shklowskii BI and Efros AL. Electronic properties of Doped Semiconductors. Springer-Verlag Berlin; 1984. v. 45, 210 p. Springer Series of Solid State Science.

[22] 22. Lepine DJ. Spin-Dependent Recombination on Silicon Surface. Physical Review B 1972; 6:436-441. http://dx.doi.org/10.1103/PhysRevB.6.436

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