Abstract
In this paper, we propose a new exogenous model to address the problem of negative interest rates that preserves the analytical tractability of the original Cox–Ingersoll–Ross (CIR) model with a perfect fit to the observed term-structure. We use the difference between two independent CIR processes and apply the deterministic-shift extension technique. To allow for a fast calibration to the market swaption surface, we apply the Gram–Charlier expansion to calculate the swaption prices in our model. We run several numerical tests to demonstrate the strengths of this model by using Monte-Carlo techniques. In particular, the model produces close Bermudan swaption prices compared to Bloomberg’s Hull–White one-factor model. Moreover, it finds constant maturity swap (CMS) rates very close to Bloomberg’s CMS rates.
Funder
European Union’s Horizon 2020 research and innovation programme
Reference30 articles.
1. Arbitrage Theory in Continuous Time;Björk,2004
2. A deterministic–shift extension of analytically–tractable and time–homogeneous short–rate models
3. Interest Rate Models: Theory and Practice: With Smile, Inflation and Credit;Brigo,2006
4. A Three-Factor Model of the Term Structure of Interest Rates;Chen,1996
5. Pricing Derivatives by Gram–Charlier Expansions;Cheng,2013