Monti, G. S., & Filzmoser, P. (2021). Sparse least trimmed squares regression with compositional covariates for high-dimensional data. Bioinformatics, 37(21), 3805–3814. https://doi.org/10.1093/bioinformatics/btab572
Computer Science Applications; Computational Mathematics; Computational Theory and Mathematics; Biochemistry; Molecular Biology; Statistics and Probability
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Abstract:
Motivation: High-throughput sequencing technologies generate a huge amount of data, permitting the quantification of microbiome compositions. The obtained data are essentially sparse compositional data vectors, namely vectors of bacterial gene proportions which compose the microbiome. Subsequently, the need for statistical and
computational methods that consider the special nature of microbiome data has increased. A critical aspect in microbiome research is to identify microbes associated with a clinical outcome. Another crucial aspect with highdimensional data is the detection of outlying observations, whose presence affects seriously the prediction
accuracy.
Results: In this article, we connect robustness and sparsity in the context of variable selection in regression with compositional covariates with a continuous response. The compositional character of the covariates is taken into account by a linear log-contrast model, and elastic-net regularization achieves sparsity in the regression coefficient estimates. Robustness is obtained by performing trimming in the objective function of the estimator. A reweighting step increases the efficiency of the estimator, and it also allows for diagnostics in terms of outlier identification. The numerical performance of the proposed method is evaluated via simulation studies, and its usefulness is illustrated by an application to a microbiome study with the aim to predict caffeine intake based on the human gut microbiome composition.