高波动环境下离散亚洲期权的估值研究

Sascha Desmettre, J. Wenzel
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引用次数: 0

摘要

本文研究了高波动率环境下布莱克-斯科尔斯模型和赫斯顿随机波动率模型中离散抽样算术和几何平均期权的蒙特卡罗估值问题。为此,我们研究了当波动率参数趋于无穷时,这些模型中资产价格的极限和收敛速度。我们观察到,一方面,资产价格及其算术均值几乎肯定会收敛于零,而各自的预期总是等于初始资产价格。另一方面,资产价格几何均值的期望收敛于零。此外,我们详细阐述了基于这些手段对期权价格的直接影响,并说明了这些发现对设计有效的蒙特卡洛估值算法的影响。作为一个合适的控制变量,我们需要在赫斯顿模型中这样的离散抽样几何亚洲期权的价格,为此我们导出了一个封闭形式的解。
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On the Valuation of Discrete Asian Options in High Volatility Environments
ABSTRACT In this paper, we are concerned with the Monte Carlo valuation of discretely sampled arithmetic and geometric average options in the Black-Scholes model and the stochastic volatility model of Heston in high volatility environments. To this end, we examine the limits and convergence rates of asset prices in these models when volatility parameters tend to infinity. We observe, on the one hand, that asset prices, as well as their arithmetic means converge to zero almost surely, while the respective expectations are constantly equal to the initial asset price. On the other hand, the expectation of geometric means of asset prices converges to zero. Moreover, we elaborate on the direct consequences for option prices based on such means and illustrate the implications of these findings for the design of efficient Monte-Carlo valuation algorithms. As a suitable control variate, we need among others the price of such discretely sampled geometric Asian options in the Heston model, for which we derive a closed-form solution.
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来源期刊
Applied Mathematical Finance
Applied Mathematical Finance Economics, Econometrics and Finance-Finance
CiteScore
2.30
自引率
0.00%
发文量
6
期刊介绍: The journal encourages the confident use of applied mathematics and mathematical modelling in finance. The journal publishes papers on the following: •modelling of financial and economic primitives (interest rates, asset prices etc); •modelling market behaviour; •modelling market imperfections; •pricing of financial derivative securities; •hedging strategies; •numerical methods; •financial engineering.
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