https://orcid.org/0000-0001-8935-2341
References
- Bianchetti, M. 2010. “Two Curves, One Price.” Risk 23 (8): 66–72.
- Brace, A., D. Gatarek, and M. Musiela. 1997. “The Market Model of Interest Rate Dynamics.” Mathematical Finance 7 (2): 127–155. doi:10.1111/1467-9965.00028.
- Brace, A., and R. Womersley. 2000. “Exact Fit to the Swaption Volatility Matrix Using Semidefinite Programming.” Working Paper, presented at ICBI Global Derivatives Conference, Paris, April.
- Crépey, S., Z. Grbac, and H.-N. Nguyen. 2012. “A Multiple-curve HJM Model of Interbank Risk.” Mathematics and Financial Economics 6 (3): 155–190. doi:10.1007/s11579-012-0083-4.
- Crépey, S., Z. Grbac, N. Ngor, and D. Skovmand. 2015. “A Lévy HJM Multiple-curve Model with Application to CVA Computation.” Quantitative Finance 15 (3): 401–419. doi:10.1080/14697688.2014.942232.
- Criens, D., K. Glau, and Z. Grbac. 2017. “Martingale Property of Exponential Semimartingales: A Note on Explicit Conditions and Applications to Asset Price and Libor Models.” Applied Mathematical Finance 24 (1): 23–37. doi:10.1080/1350486X.2017.1327324.
- Cuchiero, C., C. Fontana, and A. Gnoatto. 2016. “A General HJM Framework for Multiple Yield Curve Modeling.” Finance and Stochastics 20 (2): 267–320. doi:10.1007/s00780-016-0291-5.
- Eberlein, E. 2009. “Jump-type Lévy Processes.” In Handbook of Financial Time Series, edited by T.G. Andersen, R.A. Davis, J.-P. Kreiß, and T. Mikosch, 439–455. Berlin Heidelberg: Springer.
- Eberlein, E., and C. Gerhart. 2018. “A Multiple-curve Lévy Forward Rate Model in a Two-price Economy.” Quantitative Finance 18 (4): 537–561. doi:10.1080/14697688.2017.1384558.
- Eberlein, E., C. Gerhart, and Z. Grbac. 2019. “Multiple-curve Lévy Forward Price Model Allowing for Negative Interest Rates.” Mathematical Finance 18 (4): 537–561.
- Eberlein, E., J. Jacod, and S. Raible. 2005. “Lévy Term Structure Models: No-Arbitrage and Completeness.” Finance and Stochastics 9 (1): 67–88. doi:10.1007/s00780-004-0138-3.
- Eberlein, E., and J. Kallsen. 2019. Mathematical Finance. Cham: Springer.
- Eberlein, E., and J. Liinev. 2007. “The Lévy Swap Market Model.” Applied Mathematical Finance 14 (2): 171–196. doi:10.1080/13504860600724950.
- Eberlein, E., K. Glau, and A. Papapantoleon. 2010. “Analysis of Fourier Transform Valuation Formulas and Applications.” Applied Mathematical Finance 17 (3): 211–240. doi:10.1080/13504860903326669.
- Filipović, D., and A. B. Trolle. 2013. “The Term Structure of Interbank Risk.” Journal of Financial Economics 109 (3): 707–733. doi:10.1016/j.jfineco.2013.03.014.
- Fontana, C., Z. Grbac, S. Gümbel, and T. Schmidt. 2020. “Term Structure Modeling for Multiple Curves with Stochastic Discontinuities.” Finance and Stochastics 24: 465–511. doi:10.1007/s00780-020-00416-5.
- Gerhart, C., and E. Lütkebohmert. 2020. “Empirical Analysis and Forecasting of Multiple Yield Curves.” Insurance: Mathematics and Economics 95: 59–78.
- Grbac, Z., and A. Papapantoleon. 2013. “A Tractable LIBOR Model with Default Risk.” Mathematics and Financial Economics 7 (2): 203–227. doi:10.1007/s11579-012-0090-5.
- Grbac, Z., A. Papapantoleon, J. Schoenmakers, and D. Skovmand. 2015. “Affine LIBOR Models with Multiple Curves: Theory, Examples and Calibration.” SIAM Journal on Financial Mathematics 6 (1): 984–1025. doi:10.1137/15M1011731.
- Grbac, Z., and W. J. Runggaldier. 2015. Interest Rate Modeling: Post-Crisis Challenges and Approaches. Cham; Heidelberg; New York: SpringerBriefs in Quantitative Finance.
- Henrard, M. 2007. “The Irony in the Derivatives Discounting.” Wilmott Magazine, 92–98.
- Henrard, M. 2014. Interest Rate Modelling in the Multi-Curve Framework. Basingstoke: Palgrave Macmillan.
- International Swaps and Derivatives Association. 2019. “Interbank Offered Rate (IBOR) Fallbacks for 2006 ISDA Definitions.” Available from https://www.isda.org/a/Ua0TE/Consultation-on-Parameters-for-Fallback-Adjustments.pdf
- Jacod, J., and A. Shiryaev. 2003. Limit Theorems for Stochastic Processes. second edition: Springer.
- Kallsen, J., and A. N. Shiryaev. 2002. “The Cumulant Process and Esscher’s Change of Measure.” Finance and Stochastics 6 (4): 397–428. doi:10.1007/s007800200069.
- Kenyon, C. 2010. “Post-shock Short-rate Pricing.” Risk Magazine, November 83–87.
- Kijima, M., K. Tanaka, and T. Wong. 2009. “A Multi-quality Model of Interest Rates.” Quantitative Finance 9 (2): 133–145. doi:10.1080/14697680802624963.
- Mercurio, F. 2010a. “LIBOR Market Models with a Stochastic Basis.” Risk Magazine 23 (12): 84–89.
- Mercurio, F. 2010b. “Modern LIBOR Market Models: Using Different Curves for Projecting Rates and for Discounting.” International Journal of Theoretical and Applied Finance 13 (1): 113–137. doi:10.1142/S021902491000570X.
- Moreni, N., and A. Pallavicini. 2014. “Parsimonious HJM Modelling for Multiple Yield Curve Dynamics.” Quantitative Finance 14 (2): 199–210. doi:10.1080/14697688.2013.829242.
- Musiela, M., and M. Rutkowski. 2006. Martingale Methods in Financial Modelling. 2nd ed. Berlin, Heidelberg; New York: Springer.
- Pallavicini, A., and M. Tarenghi. 2010. “Interest-rate Modeling with Multiple Yield Curves.” Available at SSRN 1629688.
- Papapantoleon, A., and M. Siopacha. 2011. “Strong Taylor Approximation of Stochastic Differential Equations and Application to the Lévy LIBOR Model.” In Proceedings of the Actuarial and Financial Mathematics Conference, Brussels, Belgium, 2010, edited by M. Vanmaele, G. Deelstra, A. De Schepper, J. Dhaene, W. Schoutens, and S. Vanduffel, 47–62. Koninklijke Vlaamse Academie van Belgie voor Wetenschappen en Kunsten, Brussel.
- Powell, M. J. 1978. “A Fast Algorithm for Nonlinearly Constrained Optimization Calculations.” In Numerical Analysis, edited by G.A. Watson, Lecture Notes in Mathematics vol. 630, 144–157. Berlin, Heidelberg: Springer.
- Sato, K.-I. 1999. Lévy Processes and Infinitely Divisible Distributions. Cambridge: Cambridge University Press.
- Schlögl, E. 2002. “A Multicurrency Extension of the Lognormal Interest Rate Market Models.” Finance and Stochastics 6: 173–196.
- Siopacha, M., and J. Teichmann. 2011. “Weak and Strong Taylor Methods for Numerical Solutions of Stochastic Differential Equations.” Quantitative Finance 11 (4): 517–528. doi:10.1080/14697680903493573.