TREN PENELITIAN OPTION PRICING: ANALISIS BIBLIOMETRIS

Rennyta Yusiana, Dicky Chandra, Maya Sari

Abstract


The purpose of this research is to present a comprehensive overview of options pricing research and to demonstrate existing themes in the field. This research also tries to provide direction to academics in determining option prices in the future. The method used is bibliometric analysis. This analysis includes 5,367 papers from the Scopus database accessed over a 38-year period (1985-2023) and published in the top 50 finance and economics, econometrics, and financial journals. This number dropped to 913 articles after using the keyword “option pricing” as the primary search term in the “title, abstract, keywords” column. Tabular and visual representations of this analysis indicate that options pricing is a topic that has been thoroughly studied, but the sharp increase in the number of publications (56) for 2015 indicates that interest in this area is expanding. Additionally, affiliate figures show that most of the research was conducted in the United States, with China coming in second. This suggests that there may be potential to investigate option pricing in other countries. This article offers a thorough and complete review along with possible implications for future research.


Keywords


option pricing; option pricing models; bibliometric analysis; literature review

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References


Amin, K. I., Jarrow, R. A., & Johnson, S. C. (1992). PRICING OPTIONS ON RISKY ASSETS IN A STOCHASTIC INTEREST RATE ECONOMY. In Mathematical Finance (Vol. 2, Issue 4).

Aria, M., & Cuccurullo, C. (2017). bibliometrix: An R-tool for comprehensive science mapping analysis. Journal of Informetrics, 11(4), 959–975. https://doi.org/10.1016/j.joi.2017.08.007

Bates, D. S. (2003). Empirical option pricing: A retrospection. Journal of Econometrics, 116(1–2), 387–404. https://doi.org/10.1016/S0304-4076(03)00113-1

Bauwens, L., & Lubrano, M. (2002). Bayesian option pricing using asymmetric GARCH models. www.elsevier.com/locate/econbase

Black, F., & Scholes, M. (1973). The Pricing of Options and Corporate Liabilities. http://www.journals.uchicago.edu/t-and-c

Carr, P., & Wu, L. (2004). Time-changed Lévy processes and option pricing. Journal of Financial Economics, 71(1), 113–141. https://doi.org/10.1016/S0304-405X(03)00171-5

Corsi, F., Fusari, N., & La Vecchia, D. (2013). Realizing smiles: Options pricing with realized volatility. Journal of Financial Economics, 107(2), 284–304. https://doi.org/10.1016/j.jfineco.2012.08.015

Cox, J. C., Ross, S. A., & Rubinstein, M. (1979). OPTION PRICING: A SIMPLIFIED APPROACH*.

Elliott, R. J., Chan, L., & Siu, T. K. (2005). Option pricing and Esscher transform under regime switching. Annals of Finance, 1(4), 423–432. https://doi.org/10.1007/s10436-005-0013-z

Garfield, E., & Merton, R. K. 1979. Perspective on Citation Analysis of Scientist. In Citation indexing: Its theory and application in science, technology, and humanities (Vol 8). Wiley New York.

Hofmann, N., & Schweizer, M. (1992). OPTION PRICING UNDER INCOMPLETENESS AND STOCHASTIC VOLATILITY. In Mathematical Finance (Vol. 2, Issue 3).

Kallsen, J., & Taqqu, M. S. (1998). OPTION PRICING IN ARCH-TYPE MODELS. In Mathematical Finance (Vol. 8, Issue 1).

Kou, S. G. (2002). A jump-diffusion model for option pricing. Management Science, 48(8), 1086–1101. https://doi.org/10.1287/mnsc.48.8.1086.166

Kou, S. G., & Wang, H. (2004). Option pricing under a double exponential jump-diffusion model. Management Science, 50(9), 1178–1192. https://doi.org/10.1287/mnsc.1030.0163

Lars Kirkby, J. (2016). An efficient transform method for Asian option pricing. SIAM Journal on Financial Mathematics, 7(1), 845–892. https://doi.org/10.1137/16M1057127

Liu, H., & Yong, J. (2005). Option pricing with an illiquid underlying asset market. Journal of Economic Dynamics and Control, 29(12), 2125–2156. https://doi.org/10.1016/j.jedc.2004.11.004

Madan, D. B. (1991). OPTION PRICING WITH V. G. MARTINGALE COMPONENTS’. In Muthrmoticul Firiancc: Vol. I (Issue 4).

Merton, R. C. (1973). The RAND Corporation Theory of rational option pricing. In Source: The Bell Journal of Economics and Management Science (Vol. 4, Issue 1).

Nicolato, E. (2003). OPTION PRICING IN STOCHASTIC VOLATILITY MODELS OF THE ORNSTEIN-UHLENBECK TYPE. In Mathematical Finance (Vol. 13, Issue 4). www.maphysto.dk

Pilkington, A. and Liston-Heyes, C. (1999), “Is production and operations management a discipline? A citation/co-citation study”, International Journal of Operations and Production Management, Vol. 19 No. 1, pp. 7-20.

Van Eck, N. J., & Waltman, L. (2010). Software survey: VOSviewer, a computer program for bibliometric mapping. Scientometrics, 84(2), 523–538. https://doi.org/10.1007/s11192-009-0146-3

Zhang, J. E., Zhao, H., & Chang, E. C. (2012). Equilibrium asset and option pricing under jump diffusion. Mathematical Finance, 22(3), 538–568. https://doi.org/10.1111/j.1467-9965.2010.00468.x




DOI: https://doi.org/10.37058/jem.v9i2.8913

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