# Faster Method for R While Loop in least squares function

I'm trying to speed up the function below (for later bootstrapping) which performs least squares fitting of a straight line with errors in both x and y. I think the main hang up is in the while loop. The input values for the function are the observations `x` and `y` and the absolute uncertainties in those values `sx` and `sy`.

``````york <- function(x, y, sx, sy){

x <- cbind(x)
y <- cbind(y)

# initial least squares regression estimation
fit <- lm(y ~ x)
a1 <- as.numeric(fit\$coefficients[1])   # intercept
b1 <- as.numeric(fit\$coefficients[2])   # slope
e1 <- cbind(as.numeric(fit\$residuals))  # residuals
theta.fit <- rbind(a1, b1)

# constants
rho.xy <- 0     # correlation between x and y

# initialize york regression
X <- cbind(1, x)
a <- a1
b <- b1
tol <- 1e-15    # tolerance
d <- tol
i = 0

# york regression
while (d > tol || d == tol){
i <- i + 1
a2 <- a
b2 <- b
theta2 <- rbind(a2, b2)
e <- y - X %*% theta2
w <- 1 / sqrt((sy^2) + (b2^2 * sx^2) - (2 * b2 * sx * sy * rho.xy))
W <- diag(w)
theta <- solve(t(X) %*% (W %*% W) %*% X) %*% t(X) %*% (W %*% W) %*% y

a <- theta[1]
b <- theta[2]

mswd <- (t(e) %*% (W%*%W) %*% e)/(length(x) - 2)
sfit <- sqrt(mswd)
Vo <- solve(t(X) %*% (W %*% W) %*% X)
dif <- b - b2
d <- abs(dif)
}

# format results to data.frame
th <- data.frame(a, b)
names(th) <- c("intercept", "slope")
ft <- data.frame(mswd, sfit)
names(ft) <- c("mswd", "sfit")
df <- data.frame(x, y, sx, sy, as.vector(e), diag(W))
names(df) <- c("x", "y", "sx", "sy", "e", "W")

# store output results
list(coefficients = th,
vcov = Vo,
fit = ft,
df = df)
}
``````
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Just out of interest, how big are your vectors, and how long is the code taking to run? –  ChrisW Apr 23 '12 at 15:28
Allocate memory for your results vector before the loop, and then avoid cbind and rbind. –  Andrie Apr 23 '12 at 15:33
This probably isn't a particularly satisfying answer, but this is precisely the sort of function where you should probably be doing that while loop in compiled code called from R. –  joran Apr 23 '12 at 15:34
That's not very much data to be running slowly. If it were me, I would probably do some careful debugging to see what's happening in the while loop that's taking so long. Particularly as regards to your tolerance setting and successive values of d. –  joran Apr 23 '12 at 15:51
Also try using R's built-in functions for doing the weighted regression instead of rolling your own; it may or may not be faster but is certainly more dependable. `theta <- coef(lsfit(x,y,wt=w^2))` –  Aaron Apr 23 '12 at 16:36

Your function can be sped up with a few simple changes. Primarily, you should move anything out of the while loop that doesn't need to be there. For example, you run `solve` twice on the same data. Also, you calculate the `sfit` on every iteration, when you only use it on the last iteration of the while loop.

Here is my code:

``````york.fast <- function(x, y, sx, sy, tol=1e-15){
# initial least squares regression estimation
fit <- lm(y ~ x)
theta <- fit\$coefficients
# initialize york regression
X <- cbind(1, x)
d <- tol
# york regression
while (d >= tol){
b2 <- theta[2]
# w <- 1 / sqrt((sy^2) + (b2^2 * sx^2) - (2 * b2 * sx * sy * rho.xy)) # rho.xy is always zero!
w <- 1 / sqrt(sy^2 + (b2^2 * sx^2))  # rho.xy is always zero!
# W <- diag(w)
# w2 <- W %*% W
w2 <- diag(w^2) # As suggested in the comments.
base <- crossprod(X,w2)
Vo <- solve(base %*% X)
theta <- Vo %*% base %*% y
d <- abs(theta[2] - b2)
}
e <- y - X %*% theta
mswd <- (crossprod(e,w2) %*% e) / (length(x) - 2)
sfit <- sqrt(mswd)

# format results to data.frame
th <- data.frame(intercept=theta[1], slope=theta[2])
ft <- data.frame(mswd=mswd, sfit=sfit)
df <- data.frame(x=x, y=y, sx=sx, sy=sy, e=as.vector(e), W=diag(diag(w)))

# store output results
list(coefficients = th, vcov = Vo, fit = ft, df = df)
}
``````

A little test:

``````n=225
set.seed(1)
x=rnorm(n)
y=rnorm(n)
sx=rnorm(n)
sy=rnorm(n)

system.time(test<-york.fast(x,y,sx,sy)) # 0.37 s
system.time(gold<-york(x,y,sx,sy)) # 1.28 s
``````

I noticed that `rho.xy` is always fixed at zero. Is this perhaps a mistake?

I noticed as well that you often use `cbind` to convert a `vector` into a `matrix` with one column. All vectors are automatically considered matrices with one column, so you can avoid a lot of extra code.

As @joran mentioned, the tolerance level is set so small that it will take a long time to converge; consider using a larger tolerance.

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Thanks for everyone's help. I've obviously got some more to learn but these suggestions were extremely useful. –  srmulcahy Apr 23 '12 at 20:49
+1: I'd definitely prefer using existing routines for the fitting, though. Still, here's an additional speedup when doing it this way: the crossproducts can be sped up by using regular multiplication instead of matrix multiplication because the second term is a diagonal matrix. At the very least, `w2 <- diag(w^2)`, instead of `W%*%W`. –  Aaron Apr 24 '12 at 1:16