AUTHOR=Olson Hunt Megan J., Weissfeld Lisa , Boudreau Robert M., Aizenstein Howard , Newman Anne B., Simonsick Eleanor M., Van Domelen Dane R., Thomas Fridtjof , Yaffe Kristine , Rosano Caterina TITLE=A variant of sparse partial least squares for variable selection and data exploration JOURNAL=Frontiers in Neuroinformatics VOLUME=8 YEAR=2014 URL=https://www.frontiersin.org/journals/neuroinformatics/articles/10.3389/fninf.2014.00018 DOI=10.3389/fninf.2014.00018 ISSN=1662-5196 ABSTRACT=
When data are sparse and/or predictors multicollinear, current implementation of sparse partial least squares (SPLS) does not give estimates for non-selected predictors nor provide a measure of inference. In response, an approach termed “all-possible” SPLS is proposed, which fits a SPLS model for all tuning parameter values across a set grid. Noted is the percentage of time a given predictor is chosen, as well as the average non-zero parameter estimate. Using a “large” number of multicollinear predictors, simulation confirmed variables not associated with the outcome were least likely to be chosen as sparsity increased across the grid of tuning parameters, while the opposite was true for those strongly associated. Lastly, variables with a weak association were chosen more often than those with no association, but less often than those with a strong relationship to the outcome. Similarly, predictors most strongly related to the outcome had the largest average parameter estimate magnitude, followed by those with a weak relationship, followed by those with no relationship. Across two independent studies regarding the relationship between volumetric MRI measures and a cognitive test score, this method confirmed