References
- Belgrade, N., E. Benhamou, and E. Koehler. 2004. “A Market Model for Inflation.” SSRN Electronic Journal. doi:10.2139/ssrn.576081.
- Brace, A., D. Gatarek, and M. Musiela. 1997. “The Market Model of Interest Rate Dynamics.” Mathematical Finance 70 (2). doi:10.1111/1467-9965.0028.
- Cuchiero, C., and J. Teichmann. 2013. “Path Properties and Regularity of Affine Processes on General State Spaces.” In Séminaire De Probabilités XLV, Lecture Notes in Mathematics, edited by C. Donati-Martin, A. Lejay, A. Rouault, vol. 2078, 201–244. Heidelberg: Springer .
- Duffie, D., D. Filipović, and W. Schachermayer. 2003. “Affine Processes and Applications in Finance.” Annals of Applied Probability 13: 984–1053. doi:10.1214/aoap/1060202833.
- 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.
- Filipovic, D. 2005. “Time-Inhomogeneous Affine Processes.” Stochastic Processes and Their Applications 115 (4): 639–659. doi:10.1016/j.spa.2004.11.006.
- Fleckenstein, M., F. A. Longstaff, and H. N. Lustig. 2010. “Why Does the Treasury Issue TIPS? The TIPS-Treasury Bond Puzzle.” SSRN Electronic Journal. doi:10.2139/ssrn.1672982.
- 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. ISSN .
- Grbac, Z., A. Papapantoleon, J. Schoenmakers, and D. Skovmand. 2014. “Affine Libor Models with Multiple Curves: Theory, Examples and Calibration.” SIAM Journal on Financial Mathematics 6 (1): 984–1025.
- Jarrow, R., and Y. Yildirim. 2003. “Pricing Treasury Inflation Protected Securities and Related Derivatives Using an HJM Model.” Journal of Financial and Quantitative Analysis 38 (2): 337–359. doi:10.2307/4126754.
- Keller-Ressel, M. Affine Processes - Theory and Application in Finance. PhD-thesis, Wien University of Technology, 2008.
- Keller-Ressel, M., A. Papapantoleon, and J. Teichmann. 2013a. “The Affine LIBOR Models.” Mathematical Finance 23 (4): 627–658. doi:10.1111/mafi.2013.23.issue-4.
- Keller-Ressel, M., and E. Mayerhofer. 2015. “Exponential Moments of Affine Processes.” Annals of Applied Probability 25 (2): 714–752. doi:10.1214/14-AAP1009.
- Keller-Ressel, M., J. Teichmann, and W. Schachermayr. 2001. “Affine Processes are Regular.” Journal of Probability Theory and Related Fields 1510 (3–4): 591–611.
- Keller-Ressel, M., W. Schachermayer, and J. Teichmann. 2013b. “Regularity of Affine Processes on General State Spaces.” Electronic Journal Probab 18 (43): 1–17. doi:10.1214/EJP.v18-2043.
- Mercurio, F. 2005. “Pricing Inflation-Indexed Derivatives.” Journal of Quantitative Finance 5 (3): 289–302. doi:10.1080/14697680500148851.
- Mercurio, F., and N. Moreni. Inflation with a Smile. Risk magazine, 2006.
- Mercurio, F., and N. Moreni. 2009. “A Multi-Factor SABR Model for Forward Inflation Rates.” SSRN Electronic Journal. doi:10.2139/ssrn.1337811.
- Müller, W., and S. Waldenberger. 2016. “Affine Libor Models Driven by Real-valued Affine Processes.” Stochastic Models 32 (2): 333–350.