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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)
}
share|improve this question
    
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
3  
Allocate memory for your results vector before the loop, and then avoid cbind and rbind. –  Andrie Apr 23 '12 at 15:33
1  
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
2  
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
1  
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

1 Answer 1

up vote 2 down vote accepted

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

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