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A double obstacle model for pricing bi-leg defaultable interest rate swaps

Part of: Mathematical economics Mathematical finance Miscellaneous topics - Partial differential equations

Published online by Cambridge University Press:  04 September 2019

XINFU CHEN  and
JIN LIANG Open the ORCID record for JIN LIANG [Opens in a new window]
XINFU CHEN
Affiliation:
Department of Mathematics, University of Pittsburgh, Pittsburgh, PA, USA School of Mathematical Science, Tongji University, Shanghai, P. R. China emails: [email protected]; [email protected]
JIN LIANG
Affiliation:
School of Mathematical Science, Tongji University, Shanghai, P. R. China emails: [email protected]; [email protected]
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Abstract

Two mathematical models under so-called intensity and structure frameworks to pricing a double defaultable interest rate swap are established. The default could happen or jump to a high probability in both fixed and floating parties on the predetermined boundaries. The models lead to a new and interesting mathematical problem. As the intensity approaches infinity in designated regions, the solutions of the intensity models converge to a solution of a structure-type model which is an initial value problem of a partial differential equation coupled with two obstacles problem in their restricted regions. According to the value of the fixed rate, three cases are discussed. The free boundary that determines the swap rate and the free boundaries that determine the earlier termination of the contract (due to counterparty’s default) are analysed.

Keywords

Free boundarydouble obstacle variational inequalityinterest rate swapbi-leg defaultablestructure and intensity model

MSC classification

Primary: 35R35: Free boundary problems
Secondary: 91B25: Asset pricing models 91G70: Statistical methods, econometrics
Type
Papers
Information
European Journal of Applied Mathematics , Volume 31 , Issue 3 , June 2020 , pp. 511 - 543
Copyright
© Cambridge University Press 2019

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Footnotes

Chen thanks the support from the National Science Foundation Grant DMS-1516344; Liang thanks the support from the National Natural Science Foundation of China (No. 11671301).

References

Bank for International Settlements, Statistical release OTC derivatives statistics at end, December 2014, https://www.bis.org/publ/otc_hy1504.pdf, April 2015.Google Scholar
Bielecki, T. R. & Rustkowski, M. (2002) Credit Risk: Modeling, Valuation and Hedging, Springer, Berlin, Heidelberg.Google Scholar
Black, F. & Cox, J. (1976) Valuing corporate securities: some effects of bond indenture provisions. J. Finan. 31, 351367.CrossRefGoogle Scholar
Chen, X, He, P., Liu, J. & Zhao, S. (2017) A Mathematical Analysis of Credit Default Swaps with Counterparty Risks. Preprint.Google Scholar
Duffie, D. & Schaefer, S. (2003) Credit Risk Pricing, Measurement, and Management, Princeton University Press, Princeton, Oxford.Google Scholar
Duffie, D. & Singleton, K. J. (1999) Modeling term structures of defaultable bonds. Rev. Finan. Stud. 12, 687720.CrossRefGoogle Scholar
Friedman, A. (1982) Variational Principles and Free Boundary Problems, John Wiley & Sons, New York.Google Scholar
Gilbarg, D. & Trudinger, N. S. (1983) Elliptic Partial Differential Equations od Second Order, Springer-Verlag, New York.CrossRefGoogle Scholar
Hall, J. (1989) Options, Futures, & Other Derivatives, Prentice-Hall, Inc., New Jersey.Google Scholar
Hübner, G. (2001) The analytic pricing of asymmetric defaultable swaps. J. Banking Finan. 25(2), 295316.CrossRefGoogle Scholar
Hu, B., Jiang, L., Liang, J. & Wei, W. (2012) A fully non-linear PDE problem from pricing CDS with counterparty risk. Disc. Contin. Dyn. Sys. Ser. B 17, 20012016.CrossRefGoogle Scholar
Huge, B. & Lando, D. (1999) Swap pricing with two-sided default risk in a rating-based Model. Eur. Finan. Rev. 3, 239268.CrossRefGoogle Scholar
Jaffal, H., Rakotondratsimba, Y. & Yassine, A. (2013) Hedging with interest rate swap. J. Econ. Bus. Manag. 1, 107111.Google Scholar
Jiang, L. (2005) Mathematical Modeling and Methods for Option Pricing, World Scientific, Singapore.CrossRefGoogle Scholar
Jong, F., Driessen, J. & Pelsser, A. (2004) On the information in the interest rate term structure and option prices. Rev. Deriv. Res. 7, 99127.CrossRefGoogle Scholar
Lando, D. (1998) On cox processes and credit-risky securities. Rev. Deriv. Res. 2, 99120.CrossRefGoogle Scholar
Longstaff, F. & Schwartz, E. (1995) A simple approach to valuing pisky fixed and floating rate debt. J. Finan. 50, 789819.CrossRefGoogle Scholar
Merton, R. (1974) On the valuing of corporate debt: the risk structure of interest rates. J. Finan. 29, 449470.Google Scholar
Mitra, S., Date, P., Mamon, R. & Wang, I. C. (2013) Pricing and risk management of interest rate swaps. Eur. J. Oper. Res. 228, 102111.CrossRefGoogle Scholar
Sadr, A. (2009) Interest Rate Swaps and Their Derivatives, John Wiley & Sons, Inc., Hoboken, New Jersey.CrossRefGoogle Scholar