得分驱动乘性成分已实现CARR模型及其实证研究

doi:10.16381/j.cnki.issn1003-207x.2020.1893

摘要/Abstract

摘要：

本文对条件自回归极差（CARR）模型进行扩展，引入基于高频数据的已实现测度，设定条件极差具有乘性成分结构：将条件极差乘性分解为长期（趋势）成分和短期（暂时）成分，并采用得分驱动方法设定这两个成分的动态性，构建了得分驱动乘性成分已实现CARR（SD-MCRCARR）模型。基于上证综合指数和深证成分指数高频数据的实证研究表明，SD-MCRCARR模型相比其他基准模型（包括SD-CARR模型、SD-RCARR模型和SD-MCCARR模型）具有更好的数据拟合效果。利用稳健的损失函数及模型置信集（MCS）检验作为判断准则，实证比较了SD-MCRCARR模型与其他基准模型对波动率的预测能力。实证结果表明：SD-MCRCARR模型相比其他基准模型具有更好的波动率预测能力，而且SD-MCRCARR模型优越的波动率预测能力具有关于不同预测窗口和预测期的稳健性。

关键词: 价格极差, 已实现测度, CARR模型, 得分驱动模型, 乘性成分结构

Abstract:

Modelling and forecasting volatility is important for many financial applications， such as asset allocation， risk measurement and option pricing. It is well known that volatility is time-varying and highly persistent， and many models have been proposed to capture these stylized facts. The generalized autoregressive conditional heteroskedasticity （GARCH） model is among the most popular model. However， the model is return-based model that uses only daily closing prices to model and estimate volatility and fails to exploit the intraday information.An alternative approach for estimating volatility is to apply the daily price range， which is based on intraday high and low prices. The high-low price range has been proven to be a more efficient volatility estimator than the return-based one. The classical range volatility model， conditional autoregressive range （CARR） model， fails to exploits the intraday information in high-frequency data and belongs to the class of single component volatility models， which is incapable of capturing the dynamics of financial volatility adequately. An important feature of volatility is the high persistence （long memory property）. To account for this salient stylized fact of volatility， the additive component GARCH volatility models have been proposed in the earlier literature. In recent years， multiplicative component volatility models have received a great deal of attention in the financial econometrics literature. The models feature a multiplicative decomposition of volatility into a short-run and a long-run component. It is claimed that the multiplicative component models are more attractive than the additive component models， which are able to capture complex volatility dynamics such as the high persistence of volatility.By incorporating the realized measure， assuming a multiplicative component structure for the conditional range： the first component traces the long-run （secular） volatility trends， while the second component captures the short-run （transitory） movements in volatility， and adopting the score-driven approach to drive the dynamics of the two components， an extension of the CARR model is proposed， namely the score-driven multiplicative component realized CARR （SD-MCRCARR） model. The proposed SD-MCRCARR model that incorporates the realized measure （the intraday information of high-frequency data） as well as the multiplicative component volatility structure is able to quickly capture severe market fluctuation and to account for long-memory volatility. In addition， the model builds upon the score-driven framework which builds a dynamic update mechanism exploiting information contained in the score of the conditional distribution （predictive likelihood） of the observations. Also， an important advantage of the model is that the practical implementation of the model is simple since it is an observation-driven model and the likelihood function is available in closed form and therefore estimation can be easily performed by the maximum likelihood method.The empirical analysis using the high-frequency data of the Shanghai Stock Exchange Composite Index and Shenzhen Stock Exchange Component Index shows that the SD-MCRCARR model outperforms other benchmark models including the SD-CARR model， the SD-RCARR model and the SD-MCCARR model in the empirical fit. Further， the forecasting performance of the SD-MCRCARR model and the benchmark models are compared by using the robust loss functions and the model confidence set （MCS） test. The results show that the SD-MCRCARR model yields more accurate volatility forecasts than the benchmark models. Moreover， the superior forecast ability of the proposed SD-MCRCARR model is robust to alternative forecasting windows and forecasting horizons.

Key words: price range, realized measure, CARR model, score-driven model, multiplicative component structure

中图分类号:

F830.9

吴鑫育,谢海滨,马超群. 得分驱动乘性成分已实现CARR模型及其实证研究[J]. 中国管理科学, 2023, 31(8): 214-225.

Xin-yu WU,Hai-bin XIE,Chao-qun MA. Score-driven Multiplicative Component Tealized CARR Model and its Empirical Study[J]. Chinese Journal of Management Science, 2023, 31(8): 214-225.

图/表 8

表1

指数价格极差（Rt）与已实现波动率（RVt）的描述性统计量"

	样本数目	均值	最小值	最大值	标准差	偏度	峰度	Q(10)	Q(15)
SSEC
$R t$	3401	0.0114	0.0015	0.0639	0.0078	2.1229	9.4029	7887.5302	10743.4499
$R V t$	3401	0.0115	0.0024	0.0625	0.0071	2.1327	9.9966	14308.6719	19565.2563
SZSEC
$R t$	3401	0.0133	0.0017	0.0757	0.0085	2.0441	9.2682	6598.3935	8878.6354
$R V t$	3401	0.0133	0.0027	0.0728	0.0075	2.0290	9.7303	12412.7868	16782.5801

表1

表2

参数估计结果"

参数

SSEC

SZSEC

SD-CARR

SD-

RCARR

SD-

MCCARR

SD-MCRCARR

SD-

CARR

SD-

RCARR

SD-

MCCARR

SD-

MCRCARR

ω τ

0.0001

(0.0000)

0.0003

(0.0000)

0.0000

(0.0000)

0.0001

(0.0000)

0.0002

(0.0000)

0.0004

(0.0000)

0.0001

(0.0000)

0.0001

(0.0000)

α τ

0.1496

(0.0078)

0.3349

(0.0074)

0.0713

(0.0089)

0.1203

(0.0076)

0.1564

(0.0081)

0.3501

(0.0076)

0.0738

(0.0088)

0.1103

(0.0073)

β τ

0.9888

(0.0029)

0.9768

(0.0027)

0.9964

(0.0016)

0.9951

(0.0011)

0.9846

(0.0031)

0.9715

(0.0028)

0.9953

(0.0017)

0.9953

(0.0010)

α g

—

0.1095

(0.0140)

0.2390

(0.0113)

—

0.1218

(0.0144)

0.2588

(0.0111)

β g

—

0.8446

(0.0347)

0.7466

(0.0190)

—

0.7818

(0.0453)

0.7368

(0.0186)

ξ

—

0.9890

(0.0167)

—

0.9896

(0.0164)

—

0.9888

(0.0156)

—

0.9892

(0.0153)

ν 1

5.6111

(0.1347)

5.6237

(0.1636)

5.6619

(0.1391)

5.7138

(0.1656)

5.6537

(0.1358)

5.6854

(0.1622)

5.7194

(0.1403)

5.7869

(0.1640)

ν 2

—

13.1677

(0.2997)

—

13.4563

(0.3009)

—

13.2601

(0.2979)

—

13.5986

(0.3043)

l (R, R M)

—

29048.3847

—

29114.7915

—

27928.5108

—

28004.2767

l (R)

13840.0104

13873.3012

13856.2359

13902.8523

13276.9619

13327.4475

13297.7632

13349.7248

表2

表3

波动率预测评价结果"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD-MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	1.0082e-05	9.4680e-06	9.8320e-06	9.3636e-06	6.1129e-06	5.2614e-06	5.8152e-06	5.0814e-06
QLIKE	8.5367e-02	8.1198e-02	8.3608e-02	7.8957e-02	4.7234e-02	3.9839e-02	4.5878e-02	3.8787e-02
SZSEC
MSE	1.6931e-05	1.5557e-05	1.6434e-05	1.5380e-05	9.2557e-06	8.1328e-06	8.5740e-06	7.6698e-06
QLIKE	9.6594e-02	8.7423e-02	9.3713e-02	8.5675e-02	5.4347e-02	4.5692e-02	5.0739e-02	4.3204e-02

表3

表4

MCS检验结果"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	0.0335	0.5882	0.0918	1.0000	0.0000	0.2775	0.0002	1.0000
QLIKE	0.0003	0.0275	0.0047	1.0000	0.0000	0.2226	0.0000	1.0000
SZSEC
MSE	0.0001	0.4540	0.0001	1.0000	0.0000	0.0169	0.0002	1.0000
QLIKE	0.0000	0.1152	0.0000	1.0000	0.0000	0.0129	0.0000	1.0000

表4

表5

MCS检验结果（预测窗口：1000）"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	0.0072	0.3300	0.0123	1.0000	0.0002	0.5523	0.0005	1.0000
QLIKE	0.0003	0.0166	0.0008	1.0000	0.0000	0.1665	0.0000	1.0000
SZSEC
MSE	0.0020	0.2253	0.0069	1.0000	0.0001	0.1570	0.0008	1.0000
QLIKE	0.0000	0.0339	0.0000	1.0000	0.0000	0.0041	0.0000	1.0000

表5

表6

MCS检验结果（预测窗口：1500）"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	0.0163	0.3343	0.0297	1.0000	0.0004	0.6224	0.0011	1.0000
QLIKE	0.0004	0.0043	0.0043	1.0000	0.0000	0.0319	0.0000	1.0000
SZSEC
MSE	0.0063	0.1716	0.0325	1.0000	0.0003	0.1438	0.0033	1.0000
QLIKE	0.0001	0.0060	0.0001	1.0000	0.0000	0.0004	0.0000	1.0000

表6

表7

MCS检验结果（预测期：5天）"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	0.1400	0.1400	0.2650	1.0000	0.0001	0.0049	0.0049	1.0000
QLIKE	0.1527	0.0052	0.5718	1.0000	0.0002	0.0076	0.0159	1.0000
SZSEC
MSE	0.0125	0.0125	0.1126	1.0000	0.0000	0.0003	0.0004	1.0000
QLIKE	0.0040	0.0040	0.0763	1.0000	0.0000	0.0003	0.0012	1.0000

表7

表8

MCS检验结果（预测期：10天）"

	$M V t = R t$				$M V t = R V t$
	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR	SD- CARR	SD- RCARR	SD- MCCARR	SD- MCRCARR
SSEC
MSE	0.0003	0.0000	0.0201	1.0000	0.0000	0.0000	0.0004	1.0000
QLIKE	0.0000	0.0000	0.1263	1.0000	0.0000	0.0000	0.0155	1.0000
SZSEC
MSE	0.0000	0.0000	0.0033	1.0000	0.0000	0.0000	0.0000	1.0000
QLIKE	0.0000	0.0000	0.0014	1.0000	0.0000	0.0000	0.0000	1.0000

表8

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