# Get hat matrix from QR decomposition for weighted least square regression

I am trying to extend the `lwr()` function of the package `McSptial`, which fits weigthed regressions as non-parametric estimation. In the core of the `lwr()` function, it inverts a matrix using `solve()` instead of a QR decomposition, resulting in numerical instability. I would like to change it but can't figure out how to get the hat matrix (or other derivatives) from the QR decomposition afterward.

With data :

``````set.seed(0); xmat <- matrix(rnorm(500), nrow=50)    ## model matrix
y <- rowSums(rep(2:11,each=50)*xmat)    ## arbitrary values to let `lm.wfit` work
w <- runif(50, 1, 2)    ## weights
``````

The `lwr()` function goes as follows :

``````xmat2 <- w * xmat
xx <- solve(crossprod(xmat, xmat2))
xmat1 <- tcrossprod(xx, xmat2)
vmat <- tcrossprod(xmat1)
``````

I need the value of, for instance :

``````sum((xmat[1,] %*% xmat1)^2)
sqrt(diag(vmat))
``````

For the moment I use `reg <- lm.wfit(x=xmat, y=y, w=w)` but cannot manage to get back what seems to me to be the hat matrix (`xmat1`) out of it.

• Maybe stackoverflow.com/questions/8065109/… is a good start. Commented Dec 13, 2013 at 10:04
• Using the above link, I can do `xx <- qr(crossprod(xmat,k*xmat)); xxx <- qr.coef(xx, t(k*xmat[samp,])); vmat <- tcrossprod(xxx)` which give almost the same results but so much slower (around times 4). Is there a more efficient way to do it? And is there a way using lm.wfit? (Some treatment of lm.wfit worth it, like the elimination of almost-redundant columns, so that the calculus does not abort.) Commented Dec 13, 2013 at 10:33

This old question is a continuation of another old question I have just answered: Compute projection / hat matrix via QR factorization, SVD (and Cholesky factorization?). That answer discusses 3 options for computing hat matrix for an ordinary least square problem, while this question is under the context of weighted least squares. But result and method in that answer will be the basis of my answer here. Specifically, I will only demonstrate the QR approach.

OP mentioned that we can use `lm.wfit` to compute QR factorization, but we could do so using `qr.default` ourselves, which is the way I will show.

Before I proceed, I need point out that OP's code is not doing what he thinks. `xmat1` is not hat matrix; instead, `xmat %*% xmat1` is. `vmat` is not hat matrix, although I don't know what it is really. Then I don't understand what these are:

``````sum((xmat[1,] %*% xmat1)^2)
sqrt(diag(vmat))
``````

The second one looks like the diagonal of hat matrix, but as I said, `vmat` is not hat matrix. Well, anyway, I will proceed with the correct computation for hat matrix, and show how to get its diagonal and trace.

Consider a toy model matrix `X` and some uniform, positive weights `w`:

``````set.seed(0); X <- matrix(rnorm(500), nrow = 50)
w <- runif(50, 1, 2)    ## weights must be positive
rw <- sqrt(w)    ## square root of weights
``````

We first obtain `X1` (X_tilde in the latex paragraph) by row rescaling to `X`:

``````X1 <- rw * X
``````

Then we perform QR factorization to `X1`. As discussed in my linked answer, we can do this factorization with or without column pivoting. `lm.fit` or `lm.wfit` hence `lm` is not doing pivoting, but here I will use pivoted factorization as a demonstration.

``````QR <- qr.default(X1, LAPACK = TRUE)
Q <- qr.qy(QR, diag(1, nrow = nrow(QR\$qr), ncol = QR\$rank))
``````

Note we did not go on computing `tcrossprod(Q)` as in the linked answer, because that is for ordinary least squares. For weighted least squares, we want `Q1` and `Q2`:

``````Q1 <- (1 / rw) * Q
Q2 <- rw * Q
``````

If we only want the diagonal and trace of the hat matrix, there is no need to do a matrix multiplication to first get the full hat matrix. We can use

``````d <- rowSums(Q1 * Q2)  ## diagonal
# [1] 0.20597777 0.26700833 0.30503459 0.30633288 0.22246789 0.27171651
# [7] 0.06649743 0.20170817 0.16522568 0.39758645 0.17464352 0.16496177
#[13] 0.34872929 0.20523690 0.22071444 0.24328554 0.32374295 0.17190937
#[19] 0.12124379 0.18590593 0.13227048 0.10935003 0.09495233 0.08295841
#[25] 0.22041164 0.18057077 0.24191875 0.26059064 0.16263735 0.24078776
#[31] 0.29575555 0.16053372 0.11833039 0.08597747 0.14431659 0.21979791
#[37] 0.16392561 0.26856497 0.26675058 0.13254903 0.26514759 0.18343306
#[43] 0.20267675 0.12329997 0.30294287 0.18650840 0.17514183 0.21875637
#[49] 0.05702440 0.13218959

edf <- sum(d)  ## trace, sum of diagonals
# [1] 10
``````

In linear regression, `d` is the influence of each datum, and it is useful for producing confidence interval (using `sqrt(d)`) and standardised residuals (using `sqrt(1 - d)`). The trace, is the effective number of parameters or effective degree of freedom for the model (hence I call it `edf`). We see that `edf = 10`, because we have used 10 parameters: `X` has 10 columns and it is not rank-deficient.

Usually `d` and `edf` are all we need. In rare cases do we want a full hat matrix. To get it, we need an expensive matrix multiplication:

``````H <- tcrossprod(Q1, Q2)
``````

Hat matrix is particularly useful in helping us understand whether a model is local / sparse of not. Let's plot this matrix (read `?image` for details and examples on how to plot a matrix in the correct orientation):

``````image(t(H)[ncol(H):1,])
``````

We see that this matrix is completely dense. This means, prediction at each datum depends on all data, i.e., prediction is not local. While if we compare with other non-parametric prediction methods, like kernel regression, loess, P-spline (penalized B-spline regression) and wavelet, we will observe a sparse hat matrix. Therefore, these methods are known as local fitting.

• Thanks for that! To be able to compute the error degrees of freedom v = n-tr(2H-HH') I also need the diagonal of 2H-HH'. What would be the way to do this without having to calculate the full hat matrix H? I can ask this as a new question if you prefer... Commented May 20, 2019 at 7:05
• @TomWenseleers The answer code is `n - 2 * sum(Q1 * Q2) + sum(crossprod(Q1) * crossprod(Q2))`, where `Q1` and `Q2` are as defined in the answer. `n = 50` in this answer’s example. I have verified that the computation result is correct compared with that of brutal-force computation. Commented May 20, 2019 at 15:55