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Fast and Stable Credit Gamma of CVA

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  • Roberto Daluiso

Abstract

Credit Valuation Adjustment is a balance sheet item which is nowadays subject to active risk management by specialized traders. However, one of the most important risk factors, which is the vector of default intensities of the counterparty, affects in a non-differentiable way the most general Monte Carlo estimator of the adjustment, through simulation of default times. Thus the computation of first and second order (pure and mixed) sensitivities involving these inputs cannot rely on direct path-wise differentiation, while any approach involving finite differences shows very high statistical noise. We present ad hoc analytical estimators which overcome these issues while offering very low runtime overheads over the baseline computation of the price adjustment. We also discuss the conversion of the so-obtained sensitivities to model parameters (e.g. default intensities) into sensitivities to market quotes (e.g. Credit Default Swap spreads).

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  • Roberto Daluiso, 2023. "Fast and Stable Credit Gamma of CVA," Papers 2311.11672, arXiv.org.
    • Handle: RePEc:arx:papers:2311.11672
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    References listed on IDEAS

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    1. Capriotti, Luca, 2015. "Likelihood Ratio Method and Algorithmic Differentiation: Fast Second Order Greeks," Algorithmic Finance, IOS Press, vol. 4(1-2), pages 81-87.
    2. Mark S. Joshi & Dan Zhu, 2016. "Optimal Partial Proxy Method for Computing Gammas of Financial Products with Discontinuous and Angular Payoffs," Applied Mathematical Finance, Taylor & Francis Journals, vol. 23(1), pages 22-56, March.
    3. Gilles Pag`es & Olivier Pironneau & Guillaume Sall, 2016. "Vibrato and automatic differentiation for high order derivatives and sensitivities of financial options," Papers 1606.06143, arXiv.org.
    4. Jiun Hong Chan & Mark Joshi, 2015. "Optimal limit methods for computing sensitivities of discontinuous integrals including triggerable derivative securities," IISE Transactions, Taylor & Francis Journals, vol. 47(9), pages 978-997, September.
    5. Roberto Daluiso & Giorgio Facchinetti, 2018. "Algorithmic Differentiation For Discontinuous Payoffs," International Journal of Theoretical and Applied Finance (IJTAF), World Scientific Publishing Co. Pte. Ltd., vol. 21(04), pages 1-41, June.
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