Download
1 / 2
20 likes | 147 Vues
Novel Next-Generation Multijunction Quantum Dot Solar Panel Designs Using Monte Carlo-Based Modeling. Valerie Ding. r = random # generator p = absorption probability. Theories and Model Basics. Introduction. Relevance.
E N D
Novel Next-Generation Multijunction Quantum Dot Solar Panel Designs Using Monte Carlo-Based Modeling Valerie Ding r = random # generator p = absorption probability Theories and Model Basics Introduction Relevance The Sun provides a lot of power to Earth in the form of solar irradiance, photons with various energies. This provides a source of clean and unlimited renewable energy. At the current rate, 45 minutes of sunshine is enough energy to power the world for an entire year. Yet, in 2012, solar accounted for only 1% of world energy supply, which is still dominated by fossil fuels, contributing 30+ billion tons of CO2 emission each year – 100 times the weight of the entire human race! The key issue is the cost of solar energy generation. In the model, the number of photons was normalized to 10 million, distributed according to solar spectra as observed on Earth’s surface. Intensity I at photon energy E is fluxF (# photons striking surface) times E Flux changes as photons travel through solar cells. For one photon in one layer, change in flux can be expressed as a ceiling function: For a multijunction solar cell with 10 million incoming photons assumed, change in flux can be expressed as: The distribution of 10 million photons across the solar spectrum is described as following, assuming a Gaussian distribution of photon energies due to the quantum dot diameter distribution. The total solar power can be expressed as: With this model, power from a N-stack MJQDSC is related to the bandgap of quantum dots in each stack: The intrinsic spectral efficiency can be estimated as: Moreover, accounting for the thermodynamic effect due to the Carnot principle, with the temperatures of Earth’s surface and the Sun: These calculations were executed using Monte Carlo simulation and with programs written in the JAVA programming language. Raw solar spectra data from the NREL was converted from irradiance intensity as a function of wavelength l, I(l) toI(E), using calculus and computer programing: • This is a first numerical model to quantify MJQDSC efficiency. The best designs aided by the model are capable of delivering more than double the maximum efficiency of conventional solar cells. • This model provides an effective path to quickly design optimal MJQDSCs, reducing design and optimization time from years or months to days. • This method also enables direct correlation and calibration using experimental data from absorption when data is available, and is not limited to theoretical work. • With refinement, this method could be quickly adapted for other materials or a smaller-interval grid for quantum dot diameter, enabling finer optimization of MJQDSCs. • This model can quickly and drastically improve MJQDSC efficiency, enabling cost-competitiveness of clean and sustainable solar power. • The starting point of this project lies in obtaining absorption coefficients of quantum dots, which will be used in Monte Carlo modeling. • Schrödinger's equation dictates the electronic properties of each quantum dot: • h =Planck’s constant • m= particle’s mass • Ψ = particle’s wavefunction • E = eigenvalue of electron energy • Absorption coefficient of a photon with an energy E can be expressed as: • where • f represents the Fermi-Dirac distribution • δfunction is a step function = 1 when EC– EV– E = 0 and 0 otherwise. • With Quantum Dot Lab on NanoHUB.org, the eigenstates and wavefunctions for colloidal (spherical) can be calculated after materials (in this case, PbS) and diameter of quantum dots are defined. • For example, the following three graphs are eigenstates 1, 9, and 100, as calculated for colloidal PbS quantum dots with 5 nm diameter, relatively large quantum dots that absorb primarily infrared light energies. • Absorption spectra can be calculated for quantum dots with varying sizes. They are superimposed below. Sun to Earth: 1.74 X 1017 Watts Source: HoustonTomorrow.Org Accuracy and Other Factors TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD r = random # generator p = absorption probability • The model was normalized by maintaining a constant total thickness of QD layers at 18 microns. • Because the simulation involved a large number (10 million) of photons, the variation in estimated efficiencies from run to run, even using random number generation, was small. Results were stable to three significant figures. • This model accounts for fundamental spectral loss. Additional losses such as inefficient capture and transport need to be minimized to truly reap full benefits and achieve maximum efficiency. Source: International Energy Agency Cost and Efficiency of Solar Energy Solar energy costs are decreasing, but still two times those of fossil fuels. A key reason for this cost is that despite vast improvement over the years, conventional solar panels have an average efficiency of only about 15%: i.e., only 15% of solar irradiance is converted to usable electricity. Future Work • With the aid of more refined state-of-the-art quantum mechanical modeling software, a more refined grid size for quantum dots, and experimental validation of absorption coefficient data, this model is capable of accurately predicting the maximum efficiency of multijunction quantum dot solar cells using any materials and can identify the best designs. With additional programming, the vast majority of the design process could be fully automated. • With colloidal quantum dot solar cells progressing, the time has come for multijunction quantum dot solar cells to start shining. • This model can be used as a critical stepping stone in this endeavor. A key factor for the low efficiency is fundamental: the Shockley-Queisser Limit caps conventional solar cell efficiency at 34%, as most of the energy from solar irradiance is “unusable”.
MJQDSC: High Efficiency at Low Cost Results and Discussion Conclusions • Multijunction solar cells, with multilayer structures and each layer fine-tuned to absorb and convert specific energy bands of sunlight, have been demonstrated to bypass the Shockley-Queisser Limit. • It is generally accepted that multijunction solar cells are the key to improving efficiency. However, constructing effective multijunction solar cells integrating many different materials can be prohibitively expensive. • An idea has been proposed that the same materials, with the help of varying sizes of quantum dots, can be used for different stacks. This is the idea of multijunction quantum dot solar cells (MJQDSCs). • Following is a schematic showing a MJQDSC. Photons of various energies (depicted as red, green, and blue rays) are absorbed by a particular layer of specifically-sized quantum dots, with their energy converted to electricity, depicted as electrons (e-). This ensures improved efficiency in solar cells. • Using a grid of 0.5 nm for PbS quantum dot diameter and Monte Carlo modeling as discussed above, various MJQDSCs were designed and evaluated. Theirefficiencies were calculated and compared. • Following is the progression of energy spectra for best designs of 2, 3, 5 and 9-layer MJQDSCs. With a fixed total thickness, the spectral change at each quantum dot layer were tracked and plotted. The highest-efficiency PbS MJQDSC designs identified with this model are listed below. Within these MJQDSC designs, a detailed breakdown of how each layer contributes was obtained through this model. As expected, since the total thickness is held constant for comparison, increasing the number of quantum dot layers leads to higher efficiency. Nearly 80% intrinsic efficiency is achievable with 9 QD stacks. Of course, the incremental improvement decreases as the number increases; diminishing return is observed. Utilizing excellent traceability at the individual photon level in this model, statistical analysis was performed to assess the effectiveness of all aspects of these solar cells. For example, for the best 9-stack MJQDSC design, a set of detailed indicators were calculated and used to access the impact of each factor on total efficiency. Accounting for thermodynamic effect due to the Carnot principle, the maximum efficiencies for optimized designs aided by the model were calculated. • Maximum 50.0%, 57.5%, 66.1% and 75.0%-efficiency 2,3, 5, and 9-junction lead sulfide (PbS) quantum dot solar cells, respectively, were designed using Monte Carlo simulation, significantly surpassing the conventional solar cell maximum efficiency of 33.7%. • By combining quantum mechanical predictions and Monte Carlo simulation, the first ever novel model to design and optimize multijunction quantum dot solar cells was developed and tested to quickly design and optimize multijunction quantum dot solar cells, cutting design and testing time from months or even years to merely days or hours of computation. • This model has an open architecture capable of utilizing absorption properties either obtained theoretically or experimentally, enabling rapid calibration of data and refinement of predictive abilities in the future. e- e- e- e- e- e- e- e- e- References Altermatt, P. P. (2011). The Photovoltaic Principle. Sydney, Australia: PV Lighthouse. Ameri, T., Li, N., & Brabec, C. J. (2013, June). Highly efficient organic tandem solar cells. Energy & Environmental Science, pp. 2390-2413. Auger, P. (1923). Sur les rayons β secondairesproduitsdans un gaz par des rayons X. ComptesRendus de l'Académie des Sciences, 169-171. BBC Research. (2011, February). Quantum Dots: Global Market Growth and Future Commercial Prospects. Becker, A. (2013). Measuring the Universe. Boulder, CO: Department of Physics, University of Colorado at Boulder. Bent, S. (2013, September 23). Quantum Dot Solar Cell. Palo Alto, CA, USA. Bent, S. F., Brennan, T. P., Trejo, O., Roelofs, K. E., Xu, J., & Prinz, F. B. (2013, May 29). Efficiency enhancement of solid-state PbS quantum dot-sensitized solar cells with Al2O3 barrier layer. Journal of Materials Chemistry A, pp. 7566-7571. Bird, B. R., Stewart, W. E., & Lightfoot, E. N. (1960). Transport Phenomena. New York: John Wiley & Sons, Inc. Cho, E.-C., Park, S., Hao, X., Song, D., Conibeer, G., Park, S.-C., & Green, M. A. (2008, May 9). Silicon quantum dot/crystalline silicon solar cells. Nanotechnology, p. 245201. Chukwuocha, E., & Onyeaju, M. (2012, August). Effect of Quantum Confinement on The Wavelength of CdSe, ZnS And GaAs Quantum Dots (Qds). International Journal of Scientific & Technology Research, pp. 21-24. De Vos, A. (1980). Detailed balance limit of the efficiency of tandem solar cells. Journal of Physics D: Applied Physics, 839-846. den Haan, J. (2009). Solar Power. Retrieved August 6, 2012 Derkacs, D. (2013, August 20). SJ3 Concentrator Solar Cell. Retrieved from NREL Continuum: http://www.nrel.gov/continuum/spectrum/awards.cfm DiNezza, M., & Li, J. (2008, 12 10). Derivation of Optical Absorption Coefficient in Direct Semiconductors. Phoenix, AZ: Arizona State University. Retrieved from Derivation of Optical Absorption Coefficient in Direct Semiconductors. Dubertret, B. (2012, December 28). Quantum Dots. Retrieved from ExtremeTech: http://www.extremetech.com/wp-content/uploads/2012/12/quantum_dots_c.jpg Ellingson, R. J., Beard, M. C., Johnson, J. C., Yu, P., Micic, O. I., Nozik, A. J., . . . Efros, A. L. (2005). Highly Efficient Multiple Exciton Generation in Colloidal PbSe and PbS Quantum Dots. Nano Letters Vol. 5, No. 5, 865-871. Filonovich, S. (2013). 2nd and 3rd generation PV devices with nano-silicon. Optical Science & Engineering Seminar Series. Albuquerque: University of New Mexico. Gimenez, S. e. (2010, June). Determination of limiting factors of photovoltaic efficiency in quantum dot sensitized solar cells: Correlation between cell performance and structural properties. Journal of Applied Physics, p. 064301. Gueymard, C. (2013). Reference Solar Spectral Irradiance. Golden, CO: NREL Renewable Resource Data Center. Hachiya, S. e. (2011, May). Dependences of the optical absorption and photovoltaic properties of CdS quantum dot-sensitized solar cells on the CdS quantum dot adsorption time. Journal of Applied Physics, p. 054319. Hall, R. (1952). Electron-Hole Recombination in Germanium. Physical Review, 387. Hecht, J. (2001). Semiconductor Basics. In J. Hecht, Understanding Lasers. Hoboken, NJ: John Wiley & Sons, Inc. Henry, C. (1980). Limiting efficiencies of ideal single and multiple energy gap terrestrial solar cells. Journal of Applied Physics, p. 4494. Hirst, L., & Ekins-Daukes, L. (2009). Fundamental Losses in Solar Cells. 24th European Photovoltaic Solar Energy Conference and Exhibition. London: Imperial College Press. Honsberg, C., & Bowden, S. (2012, May). Standard Solar Spectra. Retrieved August 11, 2012 Ishiwata, S., Shiomi, Y., Lee, J., Bahramy, M., Suzuki, T., Uchida, M., . . . Tokura, Y. (2013). Extremely high electron mobility in a phonon-glass semimetal. Nature Materials, 512-517. Jean, J., Chang, S., Brown, P. R., Cheng, J. J., Rekemeyer, P. H., Bawendi, M. G., . . . Bulović, V. (2013, May 28). ZnO Nanowire Arrays for Enhanced Photocurrent in PbS Quantum Dot Solar Cells. Advanced Materials, pp. 2790–2796. Jiang, C.-W., & Green, M. A. (2006, November). Silicon quantum dot superlattices: Modeling of energy bands, densities of states, and mobilities for silicon tandem solar cell applications. Journal of Applied Physics, p. 114902. Jost, S. D. (2011). Linear Correlation. Chicago: DePaul University. Judkins, Z. S. (2007). A market analysis for high efficiency multi-junction solar cells grown on SiGe. Cambridge, MA: Massachusetts Institute of Technology. Kharchenko, N., & Kharchenko, V. (2013). Advanced Energy Systems, Second Edition. Boca Raton, FL: CRC Press: Taylor & Francis Group. Klimeck, G., Bjaalie, L., Steiger, S., Ebert, D., Kubin, T. C., Mannino, M., . . . Povolotskyi, M. (2011, January 27). Quantum Dot Lab. Retrieved November 21, 2012, from NanoHUB: https://nanohub.org/tools/qdot Klimeck, G., Lee, S., & Ryu, H. (2008). Introduction to Quantum Dot Lab. Retrieved August 11, 2012, from NanoHUB: https://nanohub.org/resources/4194 Kurtz, S. (2006). High-efficiency, multijunction solar cells for large-scale solar electricity generation. American Physical Society March 2006Meeting. American Physical Society. Lapedes, D. (1978). Dictionary of Scientific & Technical Terms: Second Edition. New York: McGraw-Hill. Lipovskii, A., Kolobkova, E., Petrikov, V., Kang, I., Olkhovets, A., Krauss, T., . . . Kycia, S. (1997). Synthesis and characterization of PbSe quantum dots in phosphate glass. Applied Physics Letters, 3406-3408. Lush, G. B. (2003). The Energy Band Model; EE 3329 Electronic Devices. El Paso, TX: University of Texas at El Paso. Marcus, R., Uzer, T., & Connor, J. (1984, May 15). Eigenvalues of the Schrodinger equation for a periodic potential with nonperiodic boundary conditions: A uniform semiclassical analysis. Journal of Chemical Physics, pp. 5095-5108. Markvart, T. (2007). Thermodynamics of losses in photovoltaic conversion. Applied Physics Letters, p. 064102. McKendry, C. (2010, August). Evaluating Alternative Solutions for Solar PV. Retrieved from Sustainability Engineering and Practice: http://ee80s.pbworks.com/w/page/27776775/Lab%205%3A%20Evaluating%20Alternative%20Solutions%20for%20Solar%20PV Metiu, H. (2005). Particle in a Box. In Quantum Mechanics. Santa Barbara, CA: University of California Press. Miller, D. A. (1996). Optical Physics of Quantum Wells. Institute of Physics: Quantum Dynamics of Simple Systems, pp. 239-266. MIT Microsystems Technology Laboratories. (2013, May 29). Balance is key to making quantum-dot solar cells work. Retrieved from Microsystems Technology Laboratories: Massachusetts Institute of Technology: http://www-mtl.mit.edu/news/archives/2013/05/balance_is_key.html Moebius, E. (2012, June 18). Amount of Energy the Earth Gets from the Sun. Retrieved from NASA's Cosmicopia: http://helios.gsfc.nasa.gov/qa_sun.html Myles, C. W. (2010). Quantum Confinement; PHYS 5335 Physics of Semiconductors. Lubbock, TX: Texas Tech University. Myong, S. (2007, January). Recent progress in inorganic solar cells using quantum structures. Recent patents on nanotechnology, pp. 67-73. National Center for Photovoltaics. (2012, July 23). National Center for Photovoltaics. Retrieved August 8, 2012, from National Center for Photovoltaics: http://www.nrel.gov/ncpv/ National Renewable Energy Laboratory. (2005, May 23). Quantum Dot Materials Can Reduce Heat, Boost Electrical Output. Retrieved August 6, 2012 National Renewable Energy Laboratory. (2013, November). Research Cell Efficiency Records. Retrieved from National Center for Photovoltaics: http://www.nrel.gov/ncpv/images/efficiency_chart.jpg National Science Foundation. (2012). Network for Computational Nanotechnology (NCN). Arlington, VA: National Science Foundation. Navaneethan, M., Nisha, K., Ponnusamy, S., & Muthamizchelvan, C. (2009). Optical, Structural, and Surface Morphological Studies of N-Methylaniline Capped Lead Sulphide Nanoparticles. Reviews on Advanced Materials Science, 217-224. Nordlund, K. (2005). Quantum mechanics and electronic properties of nanostructures.Helsinski, Finland: University of Helsinski Division of Materials Physics. Okada, Y. (2009). Research on Future Generation Solar Cells and Materials. Retrieved from The University of Tokyo: School of Engineering: http://www.ee.t.u-tokyo.ac.jp/gcoe/webmart_en/2009/09/research-on-future-generation.shtml Phifer, A. (2011, December 21). Notre Dame researchers develop paint-on solar cells. Notre Dame Newswire. Retrieved August 7, 2012 Polman, A., & Atwater, H. A. (2012). Photonic design principles for ultrahigh-efficiency photovoltaics. Nature Materials, 174–177. Reed, M. A. (1993). Quantum Dots. Scientific American, 118-123. Sanderson, K. (2009, June 10). Quantum dots go large. Retrieved from Nature: International Weekly Journal of Science: http://www.nature.com/news/2009/090610/full/459760a.html Santra, P., & Kamat, P. V. (2012, December 18). Tandem-Layered Quantum Dot Solar Cells: Tuning the Photovoltaic. Journal of the American Chemical Society, pp. 877-885. Sargent, T., Carey, G. H., Chou, K. W., Yan, B., Kirmani, A. R., & Amassian, A. (2013, April 25). Materials processing strategies for colloidal quantum dot solar cells: advances, present-day limitations, and pathways to improvement. Materials Research Society Communications, pp. 83-90. Schrodinger, E. (1926, December). An Undulatory Theory of the Mechanics of Atoms and Molecules. Physical Review, pp. 1049-1070. Semonin, O., Luther, J. M., & Beard, M. C. (2012, March 26). Multiple exciton generation in a quantum dot solar cell. SPIE (International Society for Optics and Photonics) Newsroom. Shalizi, C. R. (2013). Monte Carlo, and Other Kinds of Stochastic Simulation. Ann Arbor, MI: University of Michigan Center for the Study of Complex Systems. Shockley, W., & Queisser, H. J. (1961). Detailed Balance Limit of Efficiency of p-n Junction Solar Cells. Journal of Applied Physics, 510-519. Shockley, W., & Read, W. (1952). Statistics of the Recombinations of Holes and Electrons. Physical Rev, 835-842. Shoji, Y., Akimoto, K., & Okada, Y. (2012, June). Optical properties of multi-stacked InGaAs/GaNAs quantum dot solar cell fabricated on GaAs (311)B substrate. Journal of Applied Physics, p. 064314. Siklitsky, V. (2001). Si - Silicon. Retrieved from New Semiconductor Materials: Characteristics and Properties: http://www.ioffe.rssi.ru/SVA/NSM/Semicond/Si/bandstr.html Styer, D. F. (2012). Efficiency of a Carnot engine. Oberlin, OH: Oberlin College Department of Physics and Astronomy. Sun, X., Dong, Y., Li, C., & Liu, X. (2010). Photoluminescence Spectra of PbSe Quantum Dots with Different Reaction Time and Temperature. Materials Science Forum: Optoelectronic Materials, 405-408. Timp, B. A., & Zhu, X. Y. (2010). Electronic energy alignment at the PbSe quantum dots/ZnO(1010) interface. Surface Science, 1335-1341. University of Toronto: Faculty of Applied Science and Engineering. (2010, August 3). New Inexpensive Solar Cell Design is Pioneered. Engineering in the News. Van Zeghbroek, B. (2011). Principles of Semiconductor Devices. Boulder, CO: University of Colorado at Boulder Dept. of Electrical, Computer, & Energy Engineering. Wan, Y. (2003). Radiative and Nonradiative Recombination. Plano, TX: Lyle School of Engineering. Winston, W. L. (2007). Data Analysis and Business Modeling. San Francisco: O'Reilly. Wolf, O., Dasog, M., Yang, Z., Balberg, I., JGC, V., & Millo, O. (2013, May 10). Doping and Quantum Confinement Effects in Single Si Nanocrystals Observed by Scanning Tunneling Spectroscopy. Nano Letters, pp. 2516-2521. Woller, J. (1996). The Basics of Monte Carlo Simulations. Lincoln, NE: University of Nebraska-Lincoln, Physical Chemistry Lab. Yoshida, S. (1991, April 23). Patent No. 5,009,719. United States. Young, M. (2013). The silicon solar cell. Santa Barbara, CA: Santa Barbara City College. TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD AREA – THIS GUIDE WILL BE REMOVED BEFORE PRINTING – TRIFOLD Objective of Project Multijunction quantum dot solar cell is a relatively new concept proposed in the past few years. No commercial products exist. Researchers are in exploration stage focusing on understanding fundamental properties of quantum dots to utilize its properties. This project attempts to go one step beyond to achieve breakthroughs. Colloidal PbS quantum dots, the best experimentally studied low cost system is utilized. Absorption properties using quantum mechanical modeling are integrated using Monte Carlo simulation to predict photon and quantum dot interactions, which in turn is used to calculate the intrinsic solar cell efficiency to identify optimized MJQDSC configurations.
