B1476
Title: Detection of influential points as a byproduct of resampling-based variable selection procedures
Authors: Riccardo De Bin - University of Oslo (Norway) [presenting]
Anne-Laure Boulesteix - LMU Munich (Germany)
Willi Sauerbrei - Universitaet Freiburg (Germany)
Abstract: Influential points can cause severe problems when deriving a multivariable regression model. A novel approach to check for such points is proposed, based on the variable inclusion matrix, a simple way to summarize results from resampling-based variable selection procedures. The variable inclusion matrix reports whether a variable is included in a regression model fitted on a pseudo-sample generated from the original data. It is used to study the variable selection stability, to derive weights for model averaged predictors and in others investigations. Concentrating on variable selection, it also allows understanding whether the presence of a specific observation has an influence on the selection of a variable. From the variable inclusion matrix, indeed, the inclusion frequency (I-frequency) of each variable can be computed only in the pseudo-samples which contain the specific observation. When the procedure is repeated for each observation, it is possible to check for influential points through the distribution of the I-frequencies, visualized in a boxplot, or through a Grubbs' test. Outlying values in the former case and significant results in the latter point to observations having an influence on the selection of a specific variable and therefore on the finally selected model. This novel approach is illustrated in two real data examples.
