The Impact of Stochastic Volatility on Initial Margin and MVA for Interest Rate Derivatives

J. H. Hoencamp, J. P. de Kort, B. D. Kandhai
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Abstract

ABSTRACT In this research we investigate the impact of stochastic volatility on future initial margin (IM) and margin valuation adjustment (MVA) calculations for interest rate derivatives. An analysis is performed under different market conditions, namely during the peak of the Covid-19 crisis when the markets were stressed and during Q4 of 2020 when volatilities were low. The Cheyette short-rate model is extended by adding a stochastic volatility component, which is calibrated to fit the EUR swaption volatility surfaces. We incorporate the latest risk-free rate benchmarks (RFR), which in certain markets have been selected to replace the IBOR index. We extend modern Fourier pricing techniques to accommodate the RFR benchmark and derive closed-form sensitivity expressions, which are used to model IM profiles in a Monte Carlo simulation framework. The various results are compared to the deterministic volatility case. The results reveal that the inclusion of a stochastic volatility component can have a considerable impact on nonlinear derivatives, especially for far out-of-the-money swaptions. The effect is particularly pronounced if the market exhibits a substantial skew or smile in the implied volatility curve. This can have severe consequences for funding cost valuation and risk management.
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随机波动率对利率衍生品初始保证金和MVA的影响
摘要本文研究随机波动率对利率衍生品期货初始保证金(IM)和保证金估值调整(MVA)计算的影响。在不同的市场条件下进行分析,即在市场压力最大的Covid-19危机高峰期和波动性较低的2020年第四季度。Cheyette短期利率模型通过增加随机波动分量进行扩展,该随机波动分量经过校准以拟合欧元掉期波动面。我们采用了最新的无风险利率基准(RFR),该基准在某些市场已被选中取代银行同业拆借利率指数。我们扩展了现代傅立叶定价技术,以适应RFR基准,并推导出封闭形式的灵敏度表达式,用于在蒙特卡罗仿真框架中建模IM配置文件。将各种结果与确定性波动情况进行了比较。结果表明,随机波动率成分的包含可以对非线性导数产生相当大的影响,特别是对于远远超出货币的掉期。如果市场在隐含波动率曲线上显示出明显的倾斜或微笑,这种效果尤其明显。这可能对资金成本评估和风险管理产生严重后果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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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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