Preface

This is the website for my thesis for doctoral degree in Medical Science at Karolinska Institutet, Stockholm (Sweden). The code for reproducing the pdf of my thesis is available as a public repository on GitHub. The website is a direct translation of the pdf in a web page, written using the thesisdown template in bookdown.


The function of the expert reviewer is not to be more right than other people, but to be wrong for more sophisticated reasons

– Iain Chalmers and Douglas G. Altman
Systematic Reviews, 1995


Abstract

Dose–response meta-analysis is a statistical procedure for combining and contrasting the evidence on the association between a continuous exposure and the risk of a health outcome. Different papers refined selected aspects of the methodology, such as implementation of flexible strategies and extensions to multivariate meta-analysis. However, there were still several relevant questions that needed to be addressed. This thesis aims to address these issues by developing and implementing new strategies and ad-hoc measures (paper I), including tools for evaluating the goodness-of-fit (paper II), a new measure for quantifying the impact of heterogeneity (paper III), a strategy to deal with differences in the exposure range across studies (paper IV), and a one-stage approach to estimate complex models without excluding relevant studies (paper V).

In paper I, we described the implementation of the main aspects of the methodology in the dosresmeta R package available on CRAN. Dedicated functions were written to facilitate specific tasks such as definition of the design matrix and prediction of the pooled results. We illustrated how to estimate both linear and non-linear curves, conduct test of hypotheses, and present the results in a tabular and graphical format reanalyzing published aggregated dose–response data.

In paper II, we discussed how to evaluate the goodness-of-fit. The proposed solutions consist of descriptive measures to summarize the agreement between fitted and observed data (the deviance and the coefficient of determination), and graphical tools to visualize the fit of the model (decorrelated residuals-versus-exposure plot). A reanalysis of two published meta-analyses exemplified how these tools can improve the practice of quantitative synthesis of aggregated dose–response data.

In paper III, we proposed and characterized a new measure, \(\hat R_b\), to quantify the proportion of the variance of the pooled estimate attributable to the between-study heterogeneity. Contrary to the available measures of heterogeneity, \(\hat R_b\) does not make any assumption about the distribution of the within-study error variances, nor does it require specification of a typical value for these quantities. The performance of the proposed measure was evaluated in an extensive simulation study. We demonstrated how to present and interpret the \(\hat R_b\) re-analyzing three published meta-analyses.

In paper IV, we extended a point-wise approach to dose–response meta-analysis of aggregated data. The strategy consists of combining predicted relative risks for a fine grid of exposure values based on potentially different dose–response models. A point-wise approach can improve the flexibility in modeling the study-specific curves and may limit the impact of extrapolation by predicting the study-specific relative risks based on the observe exposure range. We illustrated the methodology using both individual and aggregated participant data.

In paper V, we formalized a one-stage approach for dose–response meta-analysis in terms of a linear mixed model. We explained the main aspects of the methodology and how to address the same questions frequently answered in a two-stage analysis. Using both hypothetical and real data, we showed how the one-stage approach can facilitate the assessment of heterogeneity over the exposure range, model comparison, and prediction of individual dose–response associations. The main advantage is that flexible curves can be estimated regardless of the number of data-points in the individual analyses.

In conclusion, the methods presented in this thesis enrich the set of tools available for applying dose–response meta-analyses and for addressing specific questions including goodness-of-fit evaluation (paper II) and quantification of heterogeneity (paper III). In addition, we presented alternative models for pooling results in case of heterogeneous exposure range (paper IV) and for estimating complex models without excluding relevant studies (paper V). The proposed methods have been illustrated using real data and implemented in user-friendly R packages available on CRAN (paper I).

List of publications

  • Alessio Crippa, and Nicola Orsini
    Multivariate dose–response meta-analysis: the dosresmeta R Package
    Journal of Statistical Software 2016; 72(1), 1–15

  • Andrea Discacciati, Alessio Crippa, and Nicola Orsini
    Goodness of fit tools for dose–response meta-analysis of binary outcomes
    Research Synthesis Methods 2017 Jun; 8(2):149.

  • Alessio Crippa, Polyna Khudyakov, Molin Wang, Nicola Orsini, and Donna Spiegelman
    A new measure of between-studies heterogeneity in meta-analysis
    Statistics in Medicine 2016; 35(21), 3661–75

  • Alessio Crippa, Ilias Thomas, and Nicola Orsini
    A pointwise approach to dose-response meta-analysis of aggregated data
    Manuscript 2018

  • Alessio Crippa, Andrea Discacciati, Matteo Bottai, Donna Spiegelman, and Nicola Orsini
    One-stage dose–response meta-analysis for aggregated data
    Manuscript 2018

List of abbreviations

AIC Akaike Information Criterion
BLUP Best Linear Unbiased Prediction
CI Confidence Intervals
CRAN Comprehensive R Archive Network
CS Cubic Splines
df Degrees of Freedom
GLS Generalized Least Squares
GRSS Generalized Residual Sum of Squares
GTSS Generalized Total Sum of Squares
FP2 Second-degree Fractional Polynomials
ICC Intraclass Correlation Coefficient
IPD Individual Participant Data
logRR log–Relative Risk
LOWESS Locally Weighted Scatterplot Smoothing
ML Maximum Likelihood
RCS Restricted Cubic Splines
REML Restricted Maximum Likelihood
\(R^2\) Coefficient of Determination
RR Relative Risk
SEER Surveillance, Epidemiology, and End Results
VPC Variance Partition Coefficient
WLS Weighted Least Squares