PRESS statistic for ridge regression

Question

In ordinary least squares, regressing a target vector $y$ against a set of predictors $X$, the hat matrix is computed as

$$H = X (X^tX)^{-1} X^t$$

and the PRESS (predicted residual sum of squares) is calculated by

$$SS_P = \sum_i \left( \frac{e_i}{1-h_{ii}}\right)^2$$

where $e_i$ is the $i$th residual and the $h_{ii}$ are the diagonal elements of the hat matrix.

In ridge regression with penalty coefficient $\lambda$, the hat matrix is modified to be

$$H = X (X^t X + \lambda I)^{-1} X^t$$

Can the PRESS statistic be calculated in the same way, using the modified hat matrix?

Answer 1

yes, I use this method a lot for kernel ridge regression, and it is a good way of selecting the ridge parameter (see e.g. this paper [doi,preprint]).

A search for the optimal ridge parameter can be made very efficient if the computations a performed in canonical form (see e.g. this paper), where the model is re-parametersied so that the inverse of a diagonal matrix is required.

Answer 2

The following approach can be taken to apply L2 regularisation and get the PRESS statistic. The method uses a data augmentation approach.

Assume you have N samples of Y, and K explanatory variables X1,X2...Xk....XK

1. Add additional variable X0 that has 1 over the N samples
2. Augment with K additional samples where:
   • Y value is 0 for each of the K samples
   • X0 value is 0 for each of the K samples
   • Xk value is SQRT(Lambda * N) * [STDEV(Xk) over N samples] if on diagonal, and 0 otherwise
3. There are now N+K samples and K+1 variables. A normal linear regression can be solved with these inputs.
4. As this a regression done in one step the PRESS statistic can be calculated as normal.
5. The Lambda regularisation input has to be decided. Reviewing the PRESS statistic for different inputs of Lambada can help determine a suitable value.