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Creators/Authors contains: "Bhaskaran, Aishwarya"

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  1. ; ; (, Journal of the Royal Statistical Society Series B: Statistical Methodology)
    Abstract We derive precise asymptotic results that are directly usable for confidence intervals and Wald hypothesis tests for likelihood-based generalized linear mixed model analysis. The essence of our approach is to derive the exact leading term behaviour of the Fisher information matrix when both the number of groups and number of observations within each group diverge. This leads to asymptotic normality results with simple studentizable forms. Similar analyses result in tractable leading term forms for the determination of approximate locally D-optimal designs. 
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