Numerical Methods for Mathematical Models on Warrant Pricing

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Date

2010

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Journal ISSN

Volume Title

Publisher

University of the Western Cape

Abstract

Warrant pricing has become very crucial in the present market scenario. See, for example, M. Hanke and K. Potzelberger, Consistent pricing of warrants and traded options, Review Financial Economics 11(1) (2002) 63-77 where the authors indicate that warrants issuance affects the stock price process of the issuing company. This change in the stock price process leads to subsequent changes in the prices of options written on the issuing company's stocks. Another notable work is W.G. Zhang, W.L. Xiao and C.X. He, Equity warrant pricing model under Fractional Brownian motion and an empirical study, Expert System with Applications 36(2) (2009) 3056-3065 where the authors construct equity warrants pricing model under Fractional Brownian motion and deduce the European options pricing formula with a simple method. We study this paper in details in this mini-thesis. We also study some of the mathematical models on warrant pricing using the Black-Scholes framework. The relationship between the price of the warrants and the price of the call accounts for the dilution effect is also studied mathematically. Finally we do some numerical simulations to derive the value of warrants.

Description

>Magister Scientiae - MSc

Keywords

Warrant pricing, Fractional Brownian motion, Geometric Brownian motion, Black-Scholes model, Jump diffusion models, Option-pricing model, Dilution effects, Volatility, Mathematical analysis, Numerical simulations

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