knitr::opts_chunk$set(error = TRUE)
This packages allows you to to marginalize arbitrary prediction functions using Monte-Carlo integration. Since many prediction functions cannot be easily decomposed into a sum of low dimensional components marginalization can be helpful in making these functions interpretable.
marginalPrediction
does this computation and then evaluates the marginalized function at a set grid points, which can be uniformly created, subsampled from the training data, or explicitly specified via the points
argument.
The create of a uniform grid is handled by the uniformGrid
method. If uniform = FALSE
and the points
argument isn't used to specify what points to evaluate, a sample of size n[1]
is taken from the data without replacement.
The function is integrated against a sample of size n[2]
taken without replacement from the data
. The argument int.points
can be used to override this (in which case you can specify n[2] = NA
). int.points
is a vector of integerish indices which specify rows of the data
to use instead.
library(mmpf) library(randomForest) library(ggplot2) library(reshape2) data(swiss) fit = randomForest(Fertility ~ ., swiss) mp = marginalPrediction(swiss[, -1], "Education", c(10, nrow(swiss)), fit) mp ggplot(data.frame(mp), aes(Education, preds)) + geom_point() + geom_line()
The output of marginalPrediction
is a data.table
which contains the marginalized predictions and the grid points of the vars
.
By default the Monte-Carlo expectation is computed, which is set by the aggregate.fun
argument's default value, the mean
function. Substituting, say, the median, would give a different output.
By passing the identity function to aggregate.fun
, which simply returns its input exactly, the integration points are returned directly so that the prediction
element of the return is a matrix of dimension n
. n
, although it is an argument, can be larger or smaller depending on the interaction between the input arguments n
and data
. For example if a uniform grid of size 10 is requested (via n[1]
) from a factor with only 5 levels, a uniform grid of size 5 is created. If vars
is a vector of length greater than 1, then n[1]
becomes the size of the Cartesian product of the grids created for each element of vars
, which can be at most n[1]^length(vars)
.
mp = marginalPrediction(swiss[, -1], "Education", c(10, 5), fit, aggregate.fun = identity) mp ggplot(melt(data.frame(mp), id.vars = "Education"), aes(Education, value, group = variable)) + geom_point() + geom_line() ```` `predict.fun` specifies a prediction function to apply to the `model` argument. This function must take two arguments, `object` (where `model` is inserted) and `newdata`, which is a `data.frame` to compute predictions on, which is generated internally and is controlled by the other arguments. This allows `marginalPrediction` to handle cases in which predictions for a single data point are vector-valued. That is, classification tasks where probabilities are output, and multivariate regression and/or classification. In these cases `aggregate.fun` is applied separately to each column of the prediction matrix. `aggregate.fun` must take one argument `x`, a vector output from `predict.fun` and return a vector of no greater dimension than that of `x`. ```r data(iris) fit = randomForest(Species ~ ., iris) mp = marginalPrediction(iris[, -ncol(iris)], "Petal.Width", c(10, 25), fit, predict.fun = function(object, newdata) predict(object, newdata = newdata, type = "prob")) mp plt = melt(data.frame(mp), id.vars = "Petal.Width", variable.name = "class", value.name = "prob") ggplot(plt, aes(Petal.Width, prob, color = class)) + geom_line() + geom_point()
As mentioned before, vars
can include multiple variables.
mp = marginalPrediction(iris[, -ncol(iris)], c("Petal.Width", "Petal.Length"), c(10, 25), fit, predict.fun = function(object, newdata) predict(object, newdata = newdata, type = "prob")) mp plt = melt(data.frame(mp), id.vars = c("Petal.Width", "Petal.Length"), variable.name = "class", value.name = "prob") ggplot(plt, aes(Petal.Width, Petal.Length, fill = prob)) + geom_raster() + facet_wrap(~ class)
Permutation importance is a Monte-Carlo method which estimates the importance of variables in determining predictions by computing the change in prediction error from repeatedly permuting the values of those variables.
permutationImportance
can compute this type of importance under arbitrary loss functions and contrast (between the loss with the unpermuted and permuted data).
permutationImportance(iris, "Sepal.Width", "Species", fit)
For methods which generate predictions which are characters or unordered factors, the default loss function is the mean misclassification error. For all other types of predictions mean squared error is used.
It is, for example, possible to compute the expected change in the mean misclassification rate by class. The two arguments to loss.fun
are the permuted predictions and the target variable. In this case they are both vectors of factors.
contrast.fun
takes the output of loss.fun
on both the permuted and unpermuted predictions (x
corresponds to the permuted predictions and y
the unpermuted predictions).
This can, for example, be used to compute the mean misclassification error change on a per-class basis.
permutationImportance(iris, "Sepal.Width", "Species", fit, loss.fun = function(x, y) { mat = table(x, y) n = colSums(mat) diag(mat) = 0 rowSums(mat) / n }, contrast.fun = function(x, y) x - y)
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