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RAN Lun, ZHOU Li, CHEN Qian. Simulation Methods of Stochastic Volatility Interest Rate Term Structure[J]. JOURNAL OF BEIJING INSTITUTE OF TECHNOLOGY, 2010, 19(1): 121-126.

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RAN Lun, ZHOU Li, CHEN Qian. Simulation Methods of Stochastic Volatility Interest Rate Term Structure[J].JOURNAL OF BEIJING INSTITUTE OF TECHNOLOGY, 2010, 19(1): 121-126.

RAN Lun, ZHOU Li, CHEN Qian. Simulation Methods of Stochastic Volatility Interest Rate Term Structure[J]. JOURNAL OF BEIJING INSTITUTE OF TECHNOLOGY, 2010, 19(1): 121-126.

Citation:

RAN Lun, ZHOU Li, CHEN Qian. Simulation Methods of Stochastic Volatility Interest Rate Term Structure[J].JOURNAL OF BEIJING INSTITUTE OF TECHNOLOGY, 2010, 19(1): 121-126.

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Simulation Methods of Stochastic Volatility Interest Rate Term Structure

1.
School of Management and Economics, Beijing Institute of Technology, Beijing 100081, China
2.
School of Information, Beijing Wuzi University, Beijing 101149, China

Received Date:2009-09-04

Abstract

Abstract

A term structure model bearing features of stochastic volatility and stochastic mean drift with jump (SVJ-SD model for short) is built in the paper to describe the stochastic behavior of interest rates. Based on sample data of an interest rate of national bond repurchase, maximum likelihood (ML), linear Kalman filter and efficient method of moments (EMM) are used to estimate the model. While ML works well for simple models, it may lead to considerable deviation in parameter estimation when dynamic risks of interest rates are considered in them. Linear Kalman filter is a tractable and reasonably accurate technique for estimation cases where ML was not feasible. Moreover, when compared with the first two approaches, using EMM can obtain better parameter estimates for complex models with non-affine structures.
- interest rate term structure,
- stochastic volatility,
- efficient method of moment,
- maximum likelihood,
- Kalman filter

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References (14)

References

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通讯作者:陈斌, bchen63@163.com

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沈阳化工大学材料科学与工程学院沈阳 110142

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Simulation Methods of Stochastic Volatility Interest Rate Term Structure

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