else if loop running very slowly in R

I am performing a research project into the factors that make someone more likely to vote, with a focus on the distance people live from a polling place. I the full voter registration and voter histories for millions of individuals. There are several ways in which someone can vote (in person, absentee, early, or provisional) or not vote (not registered, registered but didn't vote, or ineligible to vote). My data comes with a column (29) for how someone voted in a given election. NULL means not registered, V for in person, etc.

For regression analysis, I want to create a different column for each voter type (1 for yes, 0 for no, column numbers 68-74) and another 1/0 column (number 75) for whether or not someone voted at all. The code I wrote below should do the trick, but it's running impossibly slowly on my computer and hasn't even been able to get to the 1000th row after an hour. It works perfectly, except the speed. I've been approved to use my university's supercomputer*, but I want to figure out a faster algorithm. I have R and STATA both on my laptop and the supercomputer* and would be happy to use either.

``````dcv.new <- read.csv("VoterHist.csv", header=TRUE)
# I previously set columns 68-75 to default to 0
for(i in 1:nrow(dcv.new))
{
if(is.na(dcv.new[i,29]))
{
dcv.new[i,69] <- 1
}
else if(dcv.new[i,29]=="V")
{
dcv.new[i,68] <- 1
dcv.new[i,75] <- 1
}
else if(dcv.new[i,29]=="A")
{
dcv.new[i,70] <- 1
dcv.new[i,75] <- 1
}
else if(dcv.new[i,29]=="N")
{
dcv.new[i,71] <- 1
}
else if(dcv.new[i,29]=="E")
{
dcv.new[i,72] <- 1
}
else if(dcv.new[i,29]=="Y")
{
dcv.new[i,73] <- 1
}
else if(dcv.new[i,29]=="P")
{
dcv.new[i,74] <- 1
dcv.new[i,75] <- 1
}
else if(dcv.new[i,29]=="X")
{
dcv.new[i,74] <- 1
dcv.new[i,75] <- 1
}
}
``````

*Technically "High performance computing cluster", but let's be honest, supercomputer sounds way cooler.

-
Your problem isn't the algorithm, it's that you are in the 3rd circle of hell because you aren't writing R code, you're writing C code or something. –  joran Mar 19 '13 at 22:18
I've gone into some detail about how to do this vectorised, but also how you should probably do this for regression purposes in R. in general, for regression models or things using the formula interface you don't need to form the covariate matrix yourself, you let R's formula parsing code do that for you. –  Gavin Simpson Mar 19 '13 at 22:49
I removed the Stata tag. Stata was mentioned briefly, but the thread did not develop in terms of Stata solutions, so the Stata tag is just an irrelevance to people searching in future. If the poster wants to see a Stata solution, it might be better to repost, but with detailed explanations of Stata dataset structure, variable names, etc. In essence, there are also much simpler ways of managing the data in Stata. (STATA is a misspelling.) –  Nick Cox Mar 20 '13 at 11:01

R is vectorised, in the main, so look for vectorised operations in place of loops. In this case you can vectorise each operation so it works on the entire matrix rather than on individual rows.

Here are the first three of your `if` `else` statements:

``````dcv.new[is.na(dcv.new[,29]), 69] <- 1
dcv.new[dcv.new[,29]=="V", c(68,75)] <- 1
dcv.new[dcv.new[,29]=="A", c(70,75)] <- 1
....
``````

You should get the idea.

Some explanation:

What we are doing is selecting rows from certain columns of `dcv.new` that meet criteria (such as `== "V"`) and then we assign the value `1` to each of those selected elements of `dcv.new` in a single operation. R recycles the `1` that we assigned such that it becomes the same length as that required to fill all the selected elements.

Note how we select more than one column at once for updating: `dcv.new[x , c(68,75)]` updates columns 68 and 75 for rows `x` only, where `x` is a logical vector indexing the rows we need to update. The logical vector is produced by statements like `dcv.new[,29]=="V"`. These return a `TRUE` if an element of `dcv.new[,29]` equals `"V"` and `FALSE` if not.

However...!

In the case of regression, we can let R make the matrix of dummy variables for us, we don't need to do it by hand. Say the column `dcv.new[, 29]` was named `voterType`. If we coerce it to be a factor

``````dcv.new <- transform(dcv.new, voterType = factor(voterType))
``````

when we fit a model using the formula notation we can do:

``````mod <- lm(response ~ voterType, data = dcv.new)
``````

and R will create the appropriate contrasts to make `voterType` use the correct degrees of freedom. By default R uses the first level of a factor as the base level and hence model coefficients represent deviations from this reference level. To see what is the reference level for `voterType` after converting it to a factor do

``````with(dcv.new, levels(voterType)[1])
``````

Note that most modelling functions that take a formula, like the one shown above, work as I described and show below. You aren't restricted to `lm()` models.

Here is a small example

``````set.seed(42)
dcv.new <- data.frame(response = rnorm(20),
voterType = sample(c("V","A","N","E","Y","P","X",NA), 20,
replace = TRUE))

response voterType
1  1.3709584         E
2 -0.5646982         E
3  0.3631284         V
4  0.6328626      <NA>
5  0.4042683         E
6 -0.1061245      <NA>
``````

The model can then be fitted as

``````mod <- lm(response ~ voterType, data = dcv.new)
summary(mod)
``````

giving in this case

``````> mod <- lm(response ~ voterType, data = dcv.new)
> summary(mod)

Call:
lm(formula = response ~ voterType, data = dcv.new)

Residuals:
Min      1Q  Median      3Q     Max
-2.8241 -0.4075  0.0000  0.5856  1.9030

Coefficients:
Estimate Std. Error t value Pr(>|t|)
(Intercept)   -2.656      1.425  -1.864   0.0952 .
voterTypeE     2.612      1.593   1.639   0.1356
voterTypeN     3.040      1.646   1.847   0.0978 .
voterTypeP     2.742      1.646   1.666   0.1300
voterTypeV     2.771      1.745   1.588   0.1468
voterTypeX     2.378      2.015   1.180   0.2684
voterTypeY     3.285      1.745   1.882   0.0925 .
---
Signif. codes:  0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1

Residual standard error: 1.425 on 9 degrees of freedom
(4 observations deleted due to missingness)
Multiple R-squared: 0.3154, Adjusted R-squared: -0.1411
F-statistic: 0.6909 on 6 and 9 DF,  p-value: 0.6635
``````

The magic all happens with the formula code but essentially what happens behind the scenes is that once R has located all the variables named in the formula, it essentially ends up calling something like

``````model.matrix( ~ voterType, data = dcv.new)
``````

which generates the covariate matrix needed for the underlying matrix algebra and QR decomposition. That code above, for the small example gives:

``````> model.matrix(~ voterType, data = dcv.new)
(Intercept) voterTypeE voterTypeN voterTypeP voterTypeV voterTypeX
1            1          1          0          0          0          0
2            1          1          0          0          0          0
3            1          0          0          0          1          0
5            1          1          0          0          0          0
8            1          0          0          1          0          0
10           1          0          0          0          0          0
11           1          0          1          0          0          0
12           1          0          1          0          0          0
13           1          1          0          0          0          0
14           1          0          0          0          0          1
15           1          0          0          0          1          0
16           1          0          0          1          0          0
17           1          0          0          1          0          0
18           1          0          0          0          0          0
19           1          0          1          0          0          0
20           1          0          0          0          0          0
voterTypeY
1           0
2           0
3           0
5           0
8           0
10          1
11          0
12          0
13          0
14          0
15          0
16          0
17          0
18          0
19          0
20          1
attr(,"assign")
[1] 0 1 1 1 1 1 1
attr(,"contrasts")
attr(,"contrasts")\$voterType
[1] "contr.treatment"
``````

Which is what you are wanting to do with your code. So if you really need it, you could use `model.matrix()` like I show to also generate the matrix - stripping off the attributes as you don't need them.

In this case the reference level is `"A"`:

``````> with(dcv.new, levels(voterType)[1])
[1] "A"
``````

which is represented by the `(Intercept)` column in the output from `model.matrix`. Note that these treatment contrasts code for deviations from the reference level. You can get dummy values by suppressing the intercept in the formula by adding `-1` (0r `+0`):

``````> model.matrix(~ voterType - 1, data = dcv.new)
voterTypeA voterTypeE voterTypeN voterTypeP voterTypeV voterTypeX voterTypeY
1           0          1          0          0          0          0          0
2           0          1          0          0          0          0          0
3           0          0          0          0          1          0          0
5           0          1          0          0          0          0          0
8           0          0          0          1          0          0          0
10          0          0          0          0          0          0          1
11          0          0          1          0          0          0          0
12          0          0          1          0          0          0          0
13          0          1          0          0          0          0          0
14          0          0          0          0          0          1          0
15          0          0          0          0          1          0          0
16          0          0          0          1          0          0          0
17          0          0          0          1          0          0          0
18          1          0          0          0          0          0          0
19          0          0          1          0          0          0          0
20          0          0          0          0          0          0          1
attr(,"assign")
[1] 1 1 1 1 1 1 1
attr(,"contrasts")
attr(,"contrasts")\$voterType
[1] "contr.treatment"
``````
-
I was literally just typing `model.matrix(~ x - 1, dat)` as an answer to this question. +1 that's all he's really looking (how to convert a vector into a sparse matrix of zeroes and ones). –  Brandon Bertelsen Mar 19 '13 at 22:58

``````dcv.new[is.na(dcv.new[,29]),69] <- 1
....`enter code here`
You probably want to quote that `V` –  Gavin Simpson Mar 19 '13 at 22:22