Advanced search
Publication Cover
Quantitative Finance Volume 22, 2022 - Issue 8
Submit an article Journal homepage
2,878
Views
1
CrossRef citations to date
0
Altmetric
Research Papers

A generalized heterogeneous autoregressive model using market information

Rodrigo Hizmeri† University of Liverpool, Liverpool, UKORCID Iconhttps://orcid.org/0000-0003-2219-7863
ORCID Icon,
Marwan Izzeldin‡ Lancaster University, Lancaster, UKORCID Iconhttps://orcid.org/0000-0003-1662-1584
ORCID Icon,
Ingmar Nolte‡ Lancaster University, Lancaster, UKORCID Iconhttps://orcid.org/0000-0002-5065-8201
ORCID Icon &
Vasileios Pappas§ University of Kent, Canterbury, UKCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0003-1885-4832
ORCID Icon
Pages 1513-1534 | Received 20 Jul 2021, Accepted 06 May 2022, Published online: 02 Jun 2022

References

  • Adrian, T., Boyarchenko, N. and Giannone, D., Vulnerable growth. Amer. Econ. Rev., 2019, 109(4), 1263–1289.
  • Aït-Sahalia, Y., Kalnina, I. and Xiu, D., High-frequency factor models and regressions. J. Econom., 2020, 216(1), 86–105.
  • Andersen, T.G., Bollerslev, T. and Diebold, F.X., Roughing it up: Including jump components in the measurement, modeling, and forecasting of return volatility. Rev. Econ. Stat., 2007, 89(4), 701–720.
  • Andersen, T.G., Bollerslev, T., Diebold, F.X. and Ebens, H., The distribution of realized stock return volatility. J. Financ. Econ., 2001a, 61(1), 43–76.
  • Andersen, T.G., Bollerslev, T., Diebold, F.X. and Labys, P., The distribution of realized exchange rate volatility. J. Am. Stat. Assoc., 2001b, 96(453), 42–55.
  • Andersen, T.G., Bollerslev, T., Diebold, F.X. and Labys, P., Modeling and forecasting realized volatility. Econometrica, 2003, 71(2), 579–625.
  • Ang, A., Chen, J. and Xing, Y., Downside risk. Rev. Financ. Stud., 2006a, 19(4), 1191–1239.
  • Ang, A., Hodrick, R.J., Xing, Y. and Zhang, X., The cross-section of volatility and expected returns. J. Finance, 2006b, 61(1), 259–299.
  • Ang, A., Hodrick, R.J., Xing, Y. and Zhang, X., High idiosyncratic volatility and low returns: International and further us evidence. J. Finance Econ., 2009, 91(1), 1–23.
  • Bandi, F.M. and Russell, J.R., Separating microstructure noise from volatility. J. Financ. Econ., 2006, 79(3), 655–692.
  • Bandi, F.M., Russell, J.R. and Zhu, Y., Using high-frequency data in dynamic portfolio choice. Econom. Rev., 2008, 27(1-3), 163–198.
  • Barndorff-Nielsen, O., Kinnebrock, S. and Shephard, N., Measuring downside risk-realised semivariance. In Volatility and Time Series Econometrics: Essays in Honor of Robert F. Engle, pp. 117–136, 2010. New York: Oxford University Press.
  • Barndorff-Nielsen, O.E. and Shephard, N., Econometric analysis of realized volatility and its use in estimating stochastic volatility models. J. R. Statist. Soc.: Ser. B (Statistical Methodology), 2002a, 64(2), 253–280.
  • Barndorff-Nielsen, O.E. and Shephard, N., Estimating quadratic variation using realized variance. J. Appl. Econ., 2002b, 17(5), 457–477.
  • Barndorff-Nielsen, O.E. and Shephard, N., Econometric analysis of realized covariation: High frequency based covariance, regression, and correlation in financial economics. Econometrica, 2004, 72(3), 885–925.
  • Bekaert, G., Ehrmann, M., Fratzscher, M. and Mehl, A., The global crisis and equity market contagion. J. Finance, 2014, 69(6), 2597–2649.
  • Bernales, A. and Guidolin, M., Can we forecast the implied volatility surface dynamics of equity options? Predictability and economic value tests. J. Bank. Finance, 2014, 46, 326–342.
  • Black, F., Jensen, M.C. and Scholes, M., The capital asset pricing model: Some empirical tests. Stud. Theory Capital Markets, 1972, 81(3), 79–121.
  • Bollerslev, T., Realized semi (co) variation: Signs that all volatilities are not created equal. J. Financial Econ., 2022, 20(2), 219–252.
  • Bollerslev, T., Engle, R.F. and Nelson, D.B., Arch models. Handb. Econ., 1994, 4, 2959–3038.
  • Bollerslev, T. and Ghysels, E., Periodic autoregressive conditional heteroscedasticity. J. Bus. Econ. Stat., 1996, 14(2), 139–151.
  • Bollerslev, T., Li, J., Patton, A.J. and Quaedvlieg, R., Realized semicovariances. Econometrica, 2020, 88(4), 1515–1551.
  • Bollerslev, T., Patton, A.J. and Quaedvlieg, R., Exploiting the errors: A simple approach for improved volatility forecasting. J. Econom., 2016, 192(1), 1–18.
  • Bollerslev, T., Patton, A.J. and Quaedvlieg, R., Modeling and forecasting (un) reliable realized covariances for more reliable financial decisions. J. Econom., 2018, 207(1), 71–91.
  • Bollerslev, T. and Zhang, B.Y., Measuring and modeling systematic risk in factor pricing models using high-frequency data. J. Empiric. Finan., 2003, 10(5), 533–558.
  • Bu, R., Hizmeri, R., Izzeldin, M., Murphy, M. and Tsionas, M., The contribution of jump signs and activity to forecasting stock price volatility, 2021. Available at SSRN 3361972.
  • Busch, T., Christensen, B.J. and Nielsen, M.Ø., The role of implied volatility in forecasting future realized volatility and jumps in foreign exchange, stock, and bond markets. J. Econom., 2011, 160(1), 48–57.
  • Campbell, J.Y., Understanding risk and return. J. Polit. Econ., 1996, 104(2), 298–345.
  • Campbell, J.Y. and Hentschel, L., No news is good news: An asymmetric model of changing volatility in stock returns. J. Finance Econ., 1992, 31(3), 281–318.
  • Carriero, A., Clark, T.E. and Marcellino, M.G., Capturing macroeconomic tail risks with Bayesian vector autoregressions. FRB of Cleveland Working Paper, 2020.
  • Chen, J., Intertemporal capm and the cross-section of stock returns. In EFA 2002 Berlin Meetings Discussion Paper, 2002.
  • Chinco, A., Clark-Joseph, A.D. and Ye, M., Sparse signals in the cross-section of returns. J. Finance, 2019, 74(1), 449–492.
  • Chiriac, R. and Voev, V., Modelling and forecasting multivariate realized volatility. J. Appl. Econom., 2011, 26(6), 922–947.
  • Chordia, T., Goyal, A. and Saretto, A., Anomalies and false rejections. Rev. Financ. Stud., 2020, 33(5), 2134–2179.
  • Christensen, K., Kinnebrock, S. and Podolskij, M., Pre-averaging estimators of the ex-post covariance matrix in noisy diffusion models with non-synchronous data. J. Econom., 2010, 159(1), 116–133.
  • Christensen, K., Oomen, R.C. and Podolskij, M., Fact or friction: Jumps at ultra high frequency. J. Financ. Econ., 2014, 114(3), 576–599.
  • Christoffersen, P., Feunou, B., Jacobs, K. and Meddahi, N., The economic value of realized volatility: Using high-frequency returns for option valuation. J. Finan. Quant. Anal., 2014, 49(3), 663–697.
  • Cochrane, J.H., Presidential address: Discount rates. J. Finance, 2011, 66(4), 1047–1108.
  • Corsi, F., A simple approximate long-memory model of realized volatility. J. Finan. Econom., 2009, 7(2), 174–196.
  • Corsi, F., Pirino, D. and Renò, R., Threshold bipower variation and the impact of jumps on volatility forecasting. J. Econom., 2010, 159(2), 276–288.
  • Corsi, F. and Renò, R., Discrete-time volatility forecasting with persistent leverage effect and the link with continuous-time volatility modeling. J. Bus. Econ. Stat., 2012, 30(3), 368–380.
  • DeMiguel, V., Nogales, F.J. and Uppal, R., Stock return serial dependence and out-of-sample portfolio performance. Rev. Financ. Stud., 2014, 27(4), 1031–1073.
  • Diebold, F.X. and Lopez, J.A., 8 forecast evaluation and combination. Handb. Statist., 1996, 14, 241–268.
  • Diebold, F.X. and Yilmaz, K., Measuring financial asset return and volatility spillovers, with application to global equity markets. Econ. J., 2009, 119(534), 158–171.
  • Duffie, D., Pan, J. and Singleton, K., Transform analysis and asset pricing for affine jump-diffusions. Econometrica, 2000, 68(6), 1343–1376.
  • Duong, D. and Swanson, N.R., Empirical evidence on the importance of aggregation, asymmetry, and jumps for volatility prediction. J. Econom., 2015, 187(2), 606–621.
  • Engle, R. and Colacito, R., Testing and valuing dynamic correlations for asset allocation. J. Bus. Econ. Stat., 2006, 24(2), 238–253.
  • Fama, E.F. and French, K.R., Common risk factors in the returns on stocks and bonds. J. Financ. Econ., 1993, 33, 3–56.
  • Fama, E.F. and French, K.R., A five-factor asset pricing model. J. Financ. Econ., 2015, 116(1), 1–22.
  • Fama, E.F. and MacBeth, J.D., Risk, return, and equilibrium: Empirical tests. J. Political Econ., 1973, 81(3), 607–636.
  • Fan, J., Furger, A. and Xiu, D., Incorporating global industrial classification standard into portfolio allocation: A simple factor-based large covariance matrix estimator with high-frequency data. J. Bus. Econ. Stat., 2016, 34(4), 489–503.
  • Fleming, J., Kirby, C. and Ostdiek, B., The economic value of volatility timing. J. Finance, 2001, 56(1), 329–352.
  • Fleming, J., Kirby, C. and Ostdiek, B., The economic value of volatility timing using ‘realized’ volatility. J. Financ. Econ., 2003, 67(3), 473–509.
  • Forbes, K.J. and Rigobon, R., No contagion, only interdependence: Measuring stock market comovements. J. Finance, 2002, 57(5), 2223–2261.
  • Freyberger, J., Neuhierl, A. and Weber, M., Dissecting characteristics nonparametrically. Rev. Financ. Stud., 2020, 33(5), 2326–2377.
  • Ghysels, E. and Sinko, A., Volatility forecasting and microstructure noise. J. Econom., 2011, 160(1), 257–271.
  • Giacomini, R. and White, H., Tests of conditional predictive ability. Econometrica, 2006, 74(6), 1545–1578.
  • Giglio, S., Kelly, B. and Pruitt, S., Systemic risk and the macroeconomy: An empirical evaluation. J. Financ. Econ., 2016, 119(3), 457–471.
  • Giot, P. and Laurent, S., The information content of implied volatility in light of the jump/continuous decomposition of realized volatility. J. Futures Markets, 2007, 27(4), 337–359.
  • Glosten, L.R., Jagannathan, R. and Runkle, D.E., On the relation between the expected value and the volatility of the nominal excess return on stocks. J. Finance, 1993, 48(5), 1779–1801.
  • Grootveld, H. and Hallerbach, W., Variance vs downside risk: Is there really that much difference? Eur. J. Oper. Res., 1999, 114(2), 304–319.
  • Gu, S., Kelly, B. and Xiu, D., Empirical asset pricing via machine learning. Rev. Financ. Stud., 2020, 33(5), 2223–2273.
  • Guerard, J.B., Markowitz, H. and Xu, G., Global stock selection modeling and efficient portfolio construction and management. J. Invest., 2013, 22(4), 121–128.
  • Hansen, P.R. and Lunde, A., Realized variance and market microstructure noise. J. Bus. Econ. Stat., 2006, 24(2), 127–161.
  • Hansen, P.R., Lunde, A. and Nason, J.M., The model confidence set. Econometrica, 2011, 79(2), 453–497.
  • Harvey, C.R., Liu, Y. and Zhu, H., and the cross-section of expected returns. Rev. Financ. Stud., 2016, 29(1), 5–68.
  • Hizmeri, R., Izzeldin, M. and Nolte, I., Bolstering the modelling and forecasting of realized covariance matrices using (directional) common jumps. Available at SSRN 3745671, 2020.
  • Huang, X., Portfolio selection with a new definition of risk. Eur. J. Oper. Res., 2008, 186(1), 351–357.
  • Izzeldin, M., Hassan, M.K., Pappas, V. and Tsionas, M., Forecasting realised volatility using arfima and har models. Quant. Finance, 2019, 19(10), 1627–1638.
  • Jacod, J., Li, Y., Mykland, P.A., Podolskij, M. and Vetter, M., Microstructure noise in the continuous case: The pre-averaging approach. Stoch. Process. Their. Appl., 2009, 119(7), 2249–2276.
  • Jegadeesh, N. and Titman, S., Returns to buying winners and selling losers: Implications for stock market efficiency. J. Finance, 1993, 48(1), 65–91.
  • Li, X. and Zakamulin, V., Stock volatility predictability in bull and bear markets. Quant. Finance, 2020, 20(7), 1149–1167.
  • Lintner, J., Security prices, risk, and maximal gains from diversification. J. Finance, 1965, 20(4), 587–615.
  • Liu, F., Pantelous, A.A. and von Mettenheim, H.-J., Forecasting and trading high frequency volatility on large indices. Quant. Finance, 2018, 18(5), 737–748.
  • Marquering, W. and Verbeek, M., The economic value of predicting stock index returns and volatility. J. Finan. Quant. Anal., 2004, 39(2), 407–429.
  • Meddahi, N., A theoretical comparison between integrated and realized volatility. J. Appl. Econom., 2002, 17(5), 479–508.
  • Ng, V., Engle, R.F. and Rothschild, M., A multi-dynamic-factor model for stock returns. J. Econom., 1992, 52(1-2), 245–266.
  • Nolte, I. and Xu, Q., The economic value of volatility timing with realized jumps. J. Empir. Finance, 2015, 34, 45–59.
  • Noureldin, D., Shephard, N. and Sheppard, K., Multivariate high-frequency-based volatility (heavy) models. J. Appl. Econom., 2012, 27(6), 907–933.
  • Oh, D.H. and Patton, A.J., High-dimensional copula-based distributions with mixed frequency data. J. Econom., 2016, 193(2), 349–366.
  • Oomen, R.C.A., Comment on: ‘Realized variance and market microstructure noise’ by Peter R. Hansen and Asger Lunde. J. Bus. Econ. Stat., 2006, 24(2), 195–202.
  • Pástor, L. and Stambaugh, R.F., Liquidity risk and expected stock returns. J. Polit. Econ., 2003, 111(3), 642–685.
  • Patton, A.J., Volatility forecast comparison using imperfect volatility proxies. J. Econom., 2011, 160(1), 246–256.
  • Patton, A.J. and Sheppard, K., Good volatility, bad volatility: Signed jumps and the persistence of volatility. Rev. Econ. Statist., 2015, 97(3), 683–697.
  • Poon, S.-H. and Granger, C.W., Forecasting volatility in financial markets: A review. J. Econ. Lit., 2003, 41(2), 478–539.
  • Sharpe, W.F., Capital asset prices: A theory of market equilibrium under conditions of risk. J. Finance, 1964, 19(3), 425–442.
  • Zhang, L., Mykland, P.A. and Aït-Sahalia, Y., A tale of two time scales: Determining integrated volatility with noisy high-frequency data. J. Am. Stat. Assoc., 2005, 100(472), 1394–1411.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.