Ciurlia, Pierangelo and Gheno, Andrea (2008): A model for pricing real estate derivatives with stochastic interest rates.
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Abstract
The real estate derivatives market allows participants to manage risk and return from exposure to property, without buying or selling directly the underlying asset. Such market is growing very fast hence the need to rely on simple yet effective pricing models is very great. In order to take into account the real estate market sensitivity to the interest rate term structure in this paper is presented a two-factor model where the real estate asset value and the spot rate dynamics are jointly modeled. The pricing problem for both European and American options is then analyzed and since no closed-form solution can be found a bidimensional binomial lattice framework is adopted. The model proposed allows calibration to the interest rate and volatility term structures.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | A model for pricing real estate derivatives with stochastic interest rates |
| Language: | English |
| Subjects: | G - Financial Economics > G1 - General Financial Markets > G13 - Contingent Pricing ; Futures Pricing |
| Item ID: | 9924 |
| Depositing User: | Pierangelo Ciurlia |
| Date Deposited: | 04 Sep 2008 07:25 |
| Last Modified: | 01 Oct 2019 20:22 |
| References: | [1] F. Black, M. Scholes, The pricing of options and corporate liabilities. Journal of Political Economy 81 637-654 (1973) [2] R. Merton, Theory of rational option pricing. Bell Journal of Economics and Management Science 4 141-183 (1973) [3] F. Black, E. Derman, W. Toy, A one-factor model of interest rates and its applications to treasury bond options. Financial Analysts Journal 46 33-39 (1990) [4] R. Buttimer, J. Kau, C. Slawson, A model for securities dependent upon a real estate index. Journal of Housing Economics 6 16-30 (1997) [5] L. Trigeorgis, A log-transformed binomial numerical analysis method for valuing complex multi-option investments. Journal of Financial and Quantitative Analysis 26 309-326 (1991) [6] J. Cox, S. Ross, M. Rubinstein, Option pricing: a simplified approach. Journal of Financial Economics 7 229-263 (1979) [7] F. Jamshidian, Forward induction and construction of yield curve diffusion models. Journal of Fixed Income 1 62-74 (1991) [8] K. Sandmann, D. Sondermann, A note on the stability of lognormal interest rate models and the pricing of Eurodollar futures. Mathematical Finance 7 119-125 (1997) |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/9924 |
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