標題: A systematic and efficient simulation scheme for the Greeks of financial derivatives
作者: Lyuu, Yuh-Dauh
Teng, Huei-Wen
Tseng, Yao-Te
Wang, Sheng-Xiang
統計學研究所
資訊管理與財務金融系 註:原資管所+財金所
Institute of Statistics
Department of Information Management and Finance
關鍵字: Greeks;Dirac delta function;Variance-gamma processes;Jump-diffusion processes;Credit derivatives;Monte Carlo simulation
公開日期: 3-Jul-2019
摘要: Greeks are the price sensitivities of financial derivatives and are essential for pricing, speculation, risk management, and model calibration. Although the pathwise method has been popular for calculating them, its applicability is problematic when the integrand is discontinuous. To tackle this problem, this paper defines and derives the parameter derivative of a discontinuous integrand of certain functional forms with respect to the parameter of interest. The parameter derivative is such that its integration equals the differentiation of the integration of the aforesaid discontinuous integrand with respect to that parameter. As a result, unbiased Greek formulas for a very broad class of payoff functions and models can be systematically derived. This new method is applied to the Greeks of (1) Asian options under two popular Levy processes, i.e. Merton's jump-diffusion model and the variance-gamma process, and (2) collateralized debt obligations under the Gaussian copula model. Our Greeks outperform the finite-difference and likelihood ratio methods in terms of accuracy, variance, and computation time.
URI: http://dx.doi.org/10.1080/14697688.2018.1562196
http://hdl.handle.net/11536/152409
ISSN: 1469-7688
DOI: 10.1080/14697688.2018.1562196
期刊: QUANTITATIVE FINANCE
Volume: 19
Issue: 7
起始頁: 1199
結束頁: 1219
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