Derivation of Black-Scholes-Merton Logistic Brownian Motion Di erential Equation with Jump Di usion Process
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Date
2019
Journal Title
Journal ISSN
Volume Title
Publisher
JS Publication.
Abstract
Black- Scholes formed the foundation of option pricing. However, some of the assumptions like constant volatility and
interest among others are practically impossible to implement hence other option pricing models have been explored to
help come up with a much reliable way of predicting the price trends of options. Black-scholes assumed that the daily
logarithmic returns of individual stocks are normally distributed. This is not true in practical sense especially in short
term intervals because stock prices are able to reproduce the leptokurtic feature and to some extent the volatility smile .
To address the above problem the Jump-Di usion Model and the Kou Double-Exponential Jump-Di usion Model were
presented. But still they have not fully addressed the issue of reliable prediction because the observed implied volatility
surface is skewed and tends to atten out for longer maturities; The two models abilities to produce accurate results
are reduced. This paper ventures into a research that will involve Black-Scholes-Merton logistic-type option pricing with
jump di usion. The knowledge of logistic Brownian motion will be used to develop a logistic Brownian motion with jump
di usion model for price process.
MSC:
91GXX, 91G50, 62P05, 97M30.
Description
Keywords
Keywords: Black-Scholes formula, Brownian motion, Logistic Brownian motion, Jump di usion, Volatility.