# Vectorizing code and stuck but good

Here are some sample starting values for variables in the code below.

``````sd <- 2
sdtheory <- 1.5
meanoftheory <- 0.6
obtained <- 0.8
tails <- 2
``````

I'm trying to vectorize the following code. It is a component of a Bayes factor calculator that was originally written by Dienes and adapted to R by Danny Kaye & Thom Baguley. This part is for calculating the likelihood for the theory. I've got the thing massively sped up by vectorizing but I can't match output of the bit below.

``````area <- 0
theta <- meanoftheory - 5 * sdtheory
incr <- sdtheory / 200
for (A in -1000:1000){
theta <- theta + incr
dist_theta <- dnorm(theta, meanoftheory, sdtheory)
if(identical(tails, 1)){
if (theta <= 0){
dist_theta <- 0
} else {
dist_theta <- dist_theta * 2
}
}
height <- dist_theta * dnorm(obtained, theta, sd)
area <- area + height * incr
}
area
``````

And below is the vectorized version.

``````incr <- sdtheory / 200
newLower <- meanoftheory - 5 * sdtheory + incr
theta <- seq(newLower, by = incr, length.out = 2001)
dist_theta <- dnorm(theta, meanoftheory, sdtheory)
if (tails == 1){
dist_theta <- dist_theta[theta > 0] * 2
theta <- theta[theta > 0]
}
height <- dist_theta * dnorm(obtained, theta, sd)
area <- sum(height * incr)
area
``````

This code exactly copies the results of the original if `tails <- 2`. Everything I've got here so far should just copy and paste and give the exact same results. However, once `tails <- 1` the second function no longer matches exactly. But as near as I can tell I'm doing the equivalent in the new `if` statement to what is happening in the original. Any help would be appreciated.

(I did try to create a more minimal example, stripping it down to just he loop and if statements and a tiny amount of slices and I just couldn't get the code to fail.)

-

The original calculation has an error due to floating point arithmetic; adding `incr` each time causes `theta` to actually equal 7.204654e-14 when it should equal zero. So it's not actually doing the right thing on that pass through the loop; it's not doing the `<=` code when it should be. Your code is (at least, it did with these starting values on my machine).

Your code isn't necessarily guaranteed to do the right thing every time either; what `seq` does is better than adding an increment over and over again, but it's still floating point arithmetic. You really should probably be checking to within machine tolerance of zero, perhaps using `all.equal` or something similar.

-
Thanks Aaron, that solved the riddle. It wasn't critical that it ever actually ==0. I was just trying to replicate the values that were created by the original code. The seq() will generally be closer to correct so I'm happy with that. And I'm happy that, yet again, I found a place in this code where I can improve the accuracy. :) –  John Oct 3 '11 at 2:43

You're dropping observations where `theta==0`. That's a problem because the output of `dnorm` is not zero when `theta==0`. You need those observations in your output.

Rather than drop observations, a better solution would be to set those elements to zero.

``````incr <- sdtheory / 200
newLower <- meanoftheory - 5 * sdtheory + incr
theta <- seq(newLower, by = incr, length.out = 2001)
dist_theta <- dnorm(theta, meanoftheory, sdtheory)
if (tails == 1){
dist_theta <- ifelse(theta < 0, 0, dist_theta) * 2
theta[theta < 0] <- 0
}
height <- dist_theta * dnorm(obtained, theta, sd)
area <- sum(height * incr)
area
``````
-
Thanks Joshua, that's great!... I don't know why I didn't try that, I usually check <, <=, etc. as a matter of course. I see that you're right in the sense that it works and I was dropping 0 but I'm still not seeing why I should use theta < 0 because the original scalar version used theta<=0 so it should be dropping 0s too. Also, I did try setting the values with ifelse before. In fact, I had a version exactly the same as this only with theta <=0 but I found dropping ran 8x faster (and still does, if I run my code with theta>=0 it works now too!). Selection is much faster than ifelse. –  John Oct 1 '11 at 7:33
Hmm. When `theta` is zero, `dist_theta` should also be set to zero, so the net addition to `area` should be zero regardless of what `dnorm` is. I suspect a logic error due to floating point arithmetic instead. –  Aaron Oct 3 '11 at 2:32