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Forskningsartikel2017Vetenskapligt granskadÖppen tillgång

Generalized Confidence Intervals for Intra- and Inter-subject Coefficients of Variation in Linear Mixed-effects Models

Forkman, Johannes

Sammanfattning

Linear mixed-effects models are linear models with several variance components. Models with a single random-effects factor have two variance components: the random-effects variance, i.e., the inter-subject variance, and the residual error variance, i.e., the intra-subject variance. In many applications, it is practice to report variance components as coefficients of variation. The intra- and inter-subject coefficients of variation are the square roots of the corresponding variances divided by the mean. This article proposes methods for computing confidence intervals for intra- and inter-subject coefficients of variation using generalized pivotal quantities. The methods are illustrated through two examples. In the first example, precision is assessed within and between runs in a bioanalytical method validation. In the second example, variation is estimated within and between main plots in an agricultural split-plot experiment. Coverage of generalized confidence intervals is investigated through simulation and shown to be close to the nominal value.

Nyckelord

bioanalytical method validation; generalized pivotal quantity; linear mixed model; semiparametric mixed-effects model; split-plot experiment

Publicerad i

International Journal of Biostatistics
2017, Volym: 13, nummer: 2, artikelnummer: 20160093Utgivare: WALTER DE GRUYTER GMBH

    UKÄ forskningsämne

    Sannolikhetsteori och statistik

    Publikationens identifierare

    DOI: https://doi.org/10.1515/ijb-2016-0093

    Permanent länk till denna sida (URI)

    https://res.slu.se/id/publ/93348