A positive interest rate model with sticky barrier |
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| Authors: | Yuri Kabanov Masaaki Kijima |
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| Affiliation: | 1. Université de Franche-Comté , 16 Route de Gray, F-25030 Besancon Cedex, France;2. Central Economics and Mathematics Institute , Moscow, Russia;3. Graduate School of Social Sciences , Tokyo Metropolitan University , Tokyo, Japan;4. Daiwa Securities Chair, Graduate School of Economics, Kyoto University , Kyoto, Japan |
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| Abstract: | This paper proposes an efficient model for the term structure of interest rates when the interest rate takes very small values. We make the following choices: (i) we model the short-term interest rate, (ii) we assume that once the interest rate reaches zero, it stays there and we have to wait for a random time until the rate is reinitialized to a (possibly random) strictly positive value. This setting ensures that all term rates are strictly positive. Our objective is to provide a simple method to price zero-coupon bonds. A basic statistical study of the data at hand indeed suggests a switch to a different mode of behaviour when we get to a low level of interest rates. We introduce a variable for the time already spent at 0 (during the last stay) and derive the pricing equation for the bond. We then solve this partial integro-differential equation (PIDE) on its entire domain using a finite difference method (Cranck–Nicholson scheme), a method of characteristics and a fixed point algorithm. Resulting yield curves can exhibit many different shapes, including the S shape observed on the recent Japanese market. |
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| Keywords: | Short-term interest rate models Partial integro-differential equation Zero-interest rate Finite difference methods |
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