Научная статья на тему 'TiO2 Thin Films by Solution Technique for Solar Cells'

TiO2 Thin Films by Solution Technique for Solar Cells Текст научной статьи по специальности «Электротехника, электронная техника, информационные технологии»

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Ключевые слова
FTO / titanium dioxide / refractive indices / solution technique / characterization

Аннотация научной статьи по электротехнике, электронной технике, информационным технологиям, автор научной работы — Charles Mogunde, Cliff Orori Mosiori

Titanium dioxide has a number of applications in solar cells. In this study, TiO2 thin films were synthesized using a simple but less expensive, low temperature and large area deposition method referred to as chemical bath deposition. Their electrical and optical properties were examined at various temperatures where it was observed that the films exhibited low reflectance which increased with increase in wavelength with refractive indices of 2.2–2.5 in the visible spectra. Sheet resistivity ranged between 13.54±0.095 Ω/m to 17.27±0.209 Ω/m. They were use to fabricate photovoltaic cell which exhibited the following parameters: a short circuit current, Isc=0.002445 A, open voltage, Voc = 0.04731 V, a fill factor, FF=0.551 and an efficiency, η=0.531 %. They were recommended for diode applications.

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Текст научной работы на тему «TiO2 Thin Films by Solution Technique for Solar Cells»

TiO2 Thin Films by Solution Technique for Solar Cells

Charles Mogunde 1, Cliff Orori Mosiori 2

' Kenyatta University

P. O. Box 43844-00100, Nairobi, Kenya

2 Technical University of Mombasa P.O. Box 90420- 80100, Mombasa, Kenya

DOI: 10.22178/pos.37-1

LCC Subject Category: TP155-156

Received 20.06.2018 Accepted 20.07.2018 Published online 31.08.2018

Corresponding Author: Charles Mogunde [email protected]

© 2018 The Authors. This article is licensed under a Creative Commons Attribution 4.0 License

Abstract. Titanium dioxide has a number of applications in solar cells. In this study, TiO2 thin films were synthesized using a simple but less expensive, low temperature and large area deposition method referred to as chemical bath deposition. Their electrical and optical properties were examined at various temperatures where it was observed that the films exhibited low reflectance which increased with increase in wavelength with refractive indices of 2.2-2.5 in the visible spectra. Sheet resistivity ranged between 13.54+0.095 Q/m to 17.27+0.209 Q/m. They were use to fabricate photovoltaic cell which exhibited the following parameters: a short circuit current, Isc=0.002445 A, open voltage, Voc = 0.04731 V, a fill factor, FF=0.551 and an efficiency, n=0.531 %. They were recommended for diode applications.

Keywords: FTO; titanium dioxide; refractive indices; solution technique; characterization.

INTRODUCTION

The study of TiO2 semi conducting thin films is being pursued with an increasing interest on the account of their proven and potential applications in many semiconductor devices [12]. Although it has been one of the most studied oxides, still a lot remains to be investigated. Its applications have been met because of its understood working physics and its role in device applications. Such applications include photo induced water splitting, dye synthesized solar cells, gas sensing, and in display devices [7]. The development of new devices using titanium oxide relies on the working physics principles and therefore, any blend composites and advanced materials outside titanium oxide has its modification of mechanical, electrical, optical and thermal properties of thin films based on titanium dioxide so as to fulfil any desired demand for improved industries applications [10]. Currently, a number of investigations have been reported in literature on the electrical and optical properties of titanium oxide because much interest is geared towards the production of inexpensive thin films

for various applications including solar cell applications. Titanium dioxide exhibit varying semiconducting characteristics of many thin films that may include high resistivity [11], heat reflectivity [13], catalytic properties [2], photo thermal conductivity [14] and diode characteristics [15] among others [8, 9, 3, 6].

METHODOLOGY

Reagents and Apparatus. The following reagents were used: PVA, distilled water, ZnCl2, NH3, and NH4Cl4 among the common laboratory devices and apparatus, like an electronic thermometer, clean glass slides, cleaned and dried beaker, and measuring cylinders.

Preparation of precursor solutions. The PVA solution was prepared by adding 900 ml of distilled water to 1.8 g of solid PVA and stirred at 360 K for 1 hr [11] and left to age until its temperature dropped to room temperature.

Experimental Procedure. Chemical bath technique was used for the preparation of the TiO2 thin films in the presence of the PVA matrix in the fol-

lowing order. The bath was composed of 12 ml of 1 M ZnCl2, 12 ml of 1 M NH4CI4, 12 ml of 10 M NH3 and 13 ml of PVA solution mixed in that order in 100 ml cleaned and dried beaker. After aging, clean glass slides were inserted almost vertically into the solution and allowed to proceed for 3 hrs at a constant temperature of 340 K.

Post Deposition Treatment. The growth process was allowed to proceed at constant temperature and the duration for all the films was maintained to be the same. Then the films were removed, cleaned, and dried. They were finally annealed in an argon oven for 1 hr before characterizing.

Film Characterization. A Spectrophotometer at normal incident of light in the wavelength range of 300-2000 nm was used. Absorption and transmittance spectra, refractive indices, and optical band gaps of the samples were determined.

Solar Cell fabrication. A solar cell consisting of Au/TiO2/SnS/Au was fabricated. Using optimized TiO2 thin films with transmittance of about 62%, sheet resistivity of 13.04 H/m and band gap of 3.16±0.05 eV, SnS with average absorbance of about 46 % sheet resistivity of 2.46±0.12x105 flcm and a band energy gap of 1.25±0.12 eV was used as an absorber layer. Gold conductive paste was used as electrical contacts.

RESULTS AND DISCUSSION

As an optical property, radiation transmittance through a thin film is described as how effective radiant energy is transmitted. That is why it is taken as the fraction of incident electromagnetic power that is transmitted through a sample or as the ratio of the transmitted to incident electric field [15]. This sets a basis in that a material's internal transmittance refers to energy loss by absorption. In this work, a direct measurement by a spectrophotometer was used to obtain transmit-tance and reflectance. It was then used to determine absorbance for both annealed thin films. Transmittance and absorbance data was represented in Figures 1 and Figure 2 for annealed TiO2 thin films 250 °C.

In the Figure 1, transmittance in TiO2 thin films increased with increase in wavelength in the range of 300 - 2000 nm where it can be observed that all TiO2 thin films had a higher transmittance in the NIR region compared to VIS region. It is believed that an increase in crystallinity implied uniformity of a thin film since growth of crystal has a direct effect on transmittance [9].

400 GOO BOO 1000 1200 1400 1GOO 1800 2000 2200 Wavelength (nm) (a)

Figure 1 - Transmittance curve of annealed TiO2 films at 250 °C

90

400 600 800 1 000 1200 1 400 1 600 1 800 2 000 2200 Wavelemgth (nm) (b)

Figure 2 - Absorbance curve of annealed TiO2 films at 250 °C

In the Figure 2, there was a significant decrease in absorbance with the increase in wavelength. TiO2 films were either more transparent or more reflective at higher wavelengths as compared to lower wavelengths. This was attributed to be due to the nature of the grain size variation in relation to the wavelength of the photon energy. A comparison was made for transmittance, reflectance, and absorbance and the results were represented in Table 1.

Table 1 - Transmittance, reflec

ance, and absorbencies of TiO2 thin films

Time (minutes) 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5

Transmittance (%) 62.0 56.0 55.0 52.8 47.0 44.5 40.9 38.4

Reflectance (%) 12.5 13.8 13.9 14.3 15.0 16.0 17.2 18.0

Absorbance (%) 25.5 30.2 31.1 32.9 38.0 39.5 42.9 43.6

In thin films, annealing is taken as heat treatment that alters the physical and sometimes the chemical properties of a thin film. It is intended to increase or decrease or change or fine tune the thin film's intrinsic and extrinsic parameters to make it more or less workable or useful. It involves heating a material above its re-crystallization temperature or maintaining a suitable temperature, and then cooling it. In the annealing process, atoms migrate within the crystal lattice causing the number of dislocations to decreases [14]. Material annealing therefore can lead to phase transitions, re-crystallization, and homogenization, relaxation of internal stresses and re-arrangement of defects among other effects [15, 10] depending significantly on its kinetics, the rate of heating and cooling and the time of exposure at a given temperature.

In Figure 3, the thin films were annealed thin films of TiO2 at 300 °C. They exhibited a transmittance that increased with increase in wavelength. However, a slight reduction of transmittance in the annealed thin film samples as opposed to as-deposited ones.

Figure 3 - Transmittance curve of annealed TiO2 thin films at 300 °C

This was attributed to heat treatment which may have caused film surface changes and may have enhancing more light trapping or reflectance or absorbance [10].

Energy Band Gap

A band gap is a unique quality in thin films. When atoms come together to form a solid, their valence electrons interact using Coulomb forces [10]. The atoms feel the electric field produced by their own nucleus and that of the other atoms. As a result, two specific Quantum-Mechanical Effects takes place: through Heisenberg's uncertainty principle, the constraining of electrons to a small volume raises their energy. This is called promotion. By Pauli Exclusion Principle, which a number of electrons are limited to have the same property. In all these two effects, the valence electrons of atoms form wide valence bands when they form a solid. These bands get separated by gaps in which electrons do not exist in these gaps [8]. Therefore the term "band gap" refers to the energy difference between the top of the valence band to the bottom of the conduction band as depicted by Figure 4.

Figure 4 - Bloch equations Relation representing Band gap with density of states in semiconductor using [11]

Through this gap, electrons are able to jump from one band to another. In order for an electron to jump from a valence band to a conduction band, it requires specific minimum amount of energy for the transition to take place (the band gap energy). Band gaps of materials is important in the semiconductors, nano-material and solar technology.

In this work, the energy band gaps were determined using the semiconductor Bloch equations through simulations of transmittance data and extrapolating the linear portions of the plots

(ahv)2 against hv to where (ahv)2 = 0. The obtained value was through extrapolating the line that cuts energy (hv) axis as depicted in Figure 5.

TiO2 2.5min

2.00E+011 ■

1.50E+011

E

o >

<D

Y=Ax+B

B -1.18228E12 8.76078E9 A 3.8686E11 2.62464E9

1.00E+011

5.00E+010

0.00E+000

0.0 0.5 1.0 1.5 2.0 2.5 3.0 3.5 Energy (eV)

Figure 5 - TiO2 energy band gap using extrapolation method

Further, the various band gaps were tabulated in for both as-deposited and annealed TiO2 thin Table 2 and Table 3 for different deposition times films.

Table 2 - Band gaps of TiO2 films deposited for different durations

Time (minutes) 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5

Thickness (nm) 51.02±0.15 55.20±0.17 56.81±0.17 56.89±0.17 57.12±0.17 57.93±0.17 66.89±0.20 69.48±0.20

Eg eV (Annealed) 3.16±0.05 3.14±0.03 3.06±0.03 3.06±0.06 3.02±0.03 2.99±0.04 2.78±0.03 2.76±0.02

Eg eV (As-deposited) 3.32±0.05 3.20±0.03 3.11±0.03 3.09±0.08 3.08±0.03 3.00±0.04 2.86±0.03 2.79±0.02

Table 3 - Sheet resistivity and conc uctivity

Spray time (minutes) Resistivity ,p (H/m) Conductivity, a (S/m)

1.0 13.54±0.095 7.386 x 10-3

1.5 14.46±0.101 6.916 x 10-3

2.0 14.36±0.099 6.963 x 10-3

2.5 16.47±0.115 6.071 x 10-3

3.0 16.56±0.115 6.039 x 10-3

3.5 17.03±0.119 5.871 x 10-3

4.0 17.14±0.120 5.834 x 10-3

4.5 17.27±0.209 5.579 x 10-3

In the 300-2000 nm wavelength region, the absorption coefficient, 'a' was derived from the expression [12]:

Band gap and the energy offset was based on a simple assumed relation of atoms as . The

band gap was then calculated by the formulae [11, 1]:

KX = EBx 0 " x) + EX + Cgx (1" x)x (2) Kx= EAgX (1 - x) + EBgT+ CgX (1 - x)x (3) EgB = min ( EAbx ; E£) (4)

where the bowing parameters, C Y, C and Cgx were used as reference in one-valley band gap fit.

n = 1.489 +

3.23 x 103

HT~

(9)

The resulting combined values were obtained from the expressed [2]:

EAgB = EAg (1 - x) + El + Ce(1 - x)x

(5)

Refractive Index

In this work, refractive index was obtained using the standard Swanepoel's method instead of the Swanepoel's method that involves drawing envelopes connecting the extreme points of the interference fringes appearing in the spectrum from [11]:

n =

+V(N2 - s2)",

where N = — +

s2 +1 2

(6)

(7)

where N is the refractive index, tm is the minima of the interference fringes and 's' is the refractive index of the substrate.

Refractive index trend also followed the Sell-meier relation [9]:

n

A ^ BA"

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= A + T~—

j A - c.

(8)

with Sellmeier model's constants and film thickness consistent till a small value of Mean Square Error (MSE) was obtained.

Refractive indices was also analyzed and deduced by scout software simulation as fitted by experimental data. The values obtained were in the range of 2.2-2.5 in the visible range. Therefore, Sellmeier model gives an empirical formula. However, similar relations for the refractive index that agreed with experimental and simulated data included the Cauchy's dispersion relation expressed as [14]:

Resulting in an extinction coefficient of:

1240

. [3.05(--4.342)]

k = 6.89 x10 + 0.012 exp A (10)

Electrical properties

One of the subatomic particles of an atom is the electron. Electrons carry a negative electrostatic charge and under certain conditions can move from atom to atom in a random motion unless a force causes the electrons to move in one direction [3]. Directional movement of electrons due to an electromotive force is what is known as electricity and is used to define conductivity as a measure of how well a material accommodates the movement of an electric charge or the ratio of the current density to the electric field strength. Conductivity values are often reported as percent in IACS where IACS is an acronym for International Annealed Copper Standard, which was established by the 1913 International Electrochemical Commission [6].

Optimized sheet resistivity of TiO2 thin films deposited on FTO glass substrates was approximated to ranged between 13.54±0.095 H/m to 17.27±0.209 H/m as measured using SRM-232 surface resistivity meter. Further analysis was tabulated Table 3 and Figure 6. The observations were attributed to an increase of the grain boundaries within the crystals [13].

Sheet resistivity and conductivity of TiO films

§ 16-

-7.0 a

0.5 1.0 1.5 2.0 2.5 3.0 3.5 4.0 4.5 5.0 Spraytime (s)

Figure 6 - Relationship of Sheet resistivity and conductivity of TiO2 films

t

m

7.5

6.5

6.0

5.5

Solar Cell Parameters

A solar simulator was used to determine the Au/TiO2-SnS/Au solar cell's I-V characteristics and the results presented in Table 3. The solar cell parameters obtained from the I-V measurements included short circuit current (Isc), open circuit voltage (Voc), fill factor (FF), current at maximum power output (Imax), voltage at maximum power output (Vmax) and conversion efficiency (q). Fill factor is a measure of the quality of a cell and therefore a large fill factor of 1 or very close to 1 is desirable and it corresponds to I-V sweep that is more square-like where typical fill factors ranges from 0.50 to 0.82 [5]. The fabricated photovoltaic cell had a short circuit current, Isc=0.002445 A, open voltage, Voc=0.04731 V, a fill factor, FF=0.551 and an efficiency, n=0.531 % as shown in Table 4.

The square-like nature of the I-V curve was used to obtain the fill factor of 0.551, maximum power of 0.637 mW. It was concluded that the fabricated p-n junction resulted in the photovoltaic effect as depicted by figure 7.

0.0025

0.0020 0.0015

< E

0.0010 0.0005 0.0000

0.00 0.01 0.02 0.03 0.04 0.05

V (mV)

Figure 7 - Solar cell I-V curve characteristics CONCLUSIONS

In this study, TiO2 thin films were synthesized using chemical bath deposition. Their electrical and optical properties were examined. The thin films had refractive indices in the range of 2.22.5 in the visible range spectra and sheet resistivity ranged between 13.54±0.095 H/m to 17.27±0.209 H/m. The fabricated solar cell had a short circuit current, Isc = 0.002445 A, open voltage, Voc=0.04731 V, a fill factor, FF=0.551 and an efficiency, n=0.531 %. The thin films were recommended for solar cell and diode applications.

ACKNOWLEDGEMENTS

The authors thank department of Material Science in the University of Nairobi for allowing us use the spectrophotometer for transmission and absorbance measurements and the department of Mathematics and Physics of Technical University of Mombasa.

Table 4 - Solar Cell parameters

Cell parameters Value of parameter/unit

Isc 2.445 mA

Voc 47.31 mV

Imax 2.14 mA

Vmax 26.071 mV

Pmax 0.063744 mW

FF 0.551

n. 0.531

IV- Curve

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