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)
}
```

`theta <- coef(lsfit(x,y,wt=w^2))`

– Aaron Apr 23 '12 at 16:36