interact.erboost(x,
data,
i.var = 1,
n.trees = x$n.trees)erboost.object fitted using a call to erboostx. If the original dataset is
large, a random subsample may be used to accelerate the computation in
interact.erboosterboost formula.n.trees trees will be usedinteract.erboost computes Friedman's H-statistic to assess the relative
strength of interaction effects in non-linear models. H is on the scale of
[0-1] with higher values indicating larger interaction effects. To connect to
a more familiar measure, if $x_1$ and $x_2$ are uncorrelated covariates
with mean 0 and variance 1 and the model is of the form
$$y=\beta_0+\beta_1x_1+\beta_2x_2+\beta_3x_3$$
then
$$H=\frac{\beta_3}{\sqrt{\beta_1^2+\beta_2^2+\beta_3^2}}$$erboost, erboost.object