# More elegant way to return a sequence of numbers based on booleans?

Here's a sample of booleans I have as part of a data.frame:

```atest <- c(FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, FALSE)```

I want to return a sequence of numbers starting at 1 from each FALSE and increasing by 1 until the next FALSE.

The resulting desired vector is:

``````[1]  1  2  3  4  5  6  7  8  9 10  1  2  3  4  5  6  7  8  9 10  1
``````

Here's the code that accomplishes this, but I'm sure there's a simpler or more elegant way to do this in R. I'm always trying to learn how to code things more efficiently in R rather than simply getting the job done.

``````result <- c()
x <- 1
for(i in 1:length(atest)){
if(atest[i] == FALSE){
result[i] <- 1
x <- 1
}
if(atest[i] != FALSE){
x <- x+1
result[i] <- x
}
}
``````
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Re-allocating ("growing") an object in a for loop is a big no-no in R. It's about the slowest thing you can do. – Joshua Ulrich Jul 23 '13 at 20:59
I know I tried with an sapply but just wanted to get the basic logic out. Your solution is exactly what I was looking for. – tcash21 Jul 23 '13 at 21:15

Here's one way to do it, using handy (but not widely-known/used) base functions:

``````> sequence(tabulate(cumsum(!atest)))
[1]  1  2  3  4  5  6  7  8  9 10  1  2  3  4  5  6  7  8  9 10  1
``````

To break it down:

``````> # return/repeat integer for each FALSE
> cumsum(!atest)
[1] 1 1 1 1 1 1 1 1 1 1 2 2 2 2 2 2 2 2 2 2 3
> # count the number of occurrences of each integer
> tabulate(cumsum(!atest))
[1] 10 10  1
> # create concatenated seq_len for each integer
> sequence(tabulate(cumsum(!atest)))
[1]  1  2  3  4  5  6  7  8  9 10  1  2  3  4  5  6  7  8  9 10  1
``````
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I already +1'd, but I'd do it again as the explanation is really helpful! – Thomas Jul 23 '13 at 20:58
@Joshua Ulrich +1 for this great solution; but it fails if the first element isn't `FALSE`: `sequence(tabulate(cumsum(!atest[-1])))` – sgibb Jul 23 '13 at 20:59
@sgibb: I didn't try the OP's code before I answered, but I see it starts the first sequence at 2 if the first element isn't `FALSE`. That seems inconsistent with their text, "I want to return a sequence of numbers starting at 1 from each FALSE and increasing by 1 until the next FALSE." – Joshua Ulrich Jul 23 '13 at 21:08
This is awesome. My data will always start with a FALSE. I've never used tabulate or sequence, only seq. Thanks so much! – tcash21 Jul 23 '13 at 21:15

Here is another approach using other familiar functions:

``````seq_along(atest) - cummax(seq_along(atest) * !atest) + 1L
``````

Because it is all vectorized, it is noticeably faster than @Joshua's solution (if speed is of any concern):

``````f0 <- function(x) sequence(tabulate(cumsum(!x)))
f1 <- function(x) {i <- seq_along(x); i - cummax(i * !x) + 1L}
x  <- rep(atest, 10000)

library(microbenchmark)
microbenchmark(f0(x), f1(x))
# Unit: milliseconds
#   expr       min        lq    median        uq      max neval
#  f0(x) 19.386581 21.853194 24.511783 26.703705 57.20482   100
#  f1(x)  3.518581  3.976605  5.962534  7.763618 35.95388   100

identical(f0(x), f1(x))
# [1] TRUE
``````
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+1 slightly more cryptic, but a nice speedup! – Joshua Ulrich Jul 29 '13 at 17:31

Problems like these tend to work well with `Rcpp`. Borrowing @flodel's code as a framework for benchmarking,

``````boolseq.cpp
-----------

#include <Rcpp.h>
using namespace Rcpp;

// [[Rcpp::export]]
IntegerVector boolSeq(LogicalVector x) {
int n = x.length();
IntegerVector output = no_init(n);
int counter = 1;
for (int i=0; i < n; ++i) {
if (!x[i]) {
counter = 1;
}
output[i] = counter;
++counter;
}
return output;
}

/*** R
x <- c(FALSE, sample( c(FALSE, TRUE), 1E5, TRUE ))

f0 <- function(x) sequence(tabulate(cumsum(!x)))
f1 <- function(x) {i <- seq_along(x); i - cummax(i * !x) + 1L}

library(microbenchmark)
microbenchmark(f0(x), f1(x), boolSeq(x), times=100)

stopifnot(identical(f0(x), f1(x)))
stopifnot(identical(f1(x), boolSeq(x)))
*/
``````

`sourceCpp`ing it gives me:

``````Unit: microseconds
expr       min        lq     median         uq       max neval
f0(x) 18174.348 22163.383 24109.5820 29668.1150 78144.411   100
f1(x)  1498.871  1603.552  2251.3610  2392.1670  2682.078   100
boolSeq(x)   388.288   426.034   518.2875   571.4235   699.710   100
``````

Less elegant, but pretty darn close to what you were writing with R code.

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+1 Show off! :-P – Joshua Ulrich Mar 17 '14 at 11:54