• Title of article

    Model averaging by jackknife criterion in models with dependent data

  • Author/Authors

    Zhang، نويسنده , , Xinyu and Wan، نويسنده , , Alan T.K. and Zou، نويسنده , , Guohua، نويسنده ,

  • Pages
    13
  • From page
    82
  • To page
    94
  • Abstract
    The past decade witnessed a literature on model averaging by frequentist methods. For the most part, the asymptotic optimality of various existing frequentist model averaging estimators has been established under i.i.d. errors. Recently, Hansen and Racine [Hansen, B.E., Racine, J., 2012. Jackknife model averaging. Journal of Econometrics 167, 38–46] developed a jackknife model averaging (JMA) estimator, which has an important advantage over its competitors in that it achieves the lowest possible asymptotic squared error under heteroscedastic errors. In this paper, we broaden Hansen and Racine’s scope of analysis to encompass models with (i) a non-diagonal error covariance structure, and (ii) lagged dependent variables, thus allowing for dependent data. We show that under these set-ups, the JMA estimator is asymptotically optimal by a criterion equivalent to that used by Hansen and Racine. A Monte Carlo study demonstrates the finite sample performance of the JMA estimator in a variety of model settings.
  • Keywords
    cross-validation , Model Averaging , Squared error , Asymptotic optimality , autocorrelation , Lagged dependent variables
  • Journal title
    Astroparticle Physics
  • Record number

    2041850