# Fast vectorized function to check if a value is in an interval

Is there a function in R that efficiently checks if a value is larger than one and smaller than another number? It should work with vectors, too.

Essentially, I'm looking for a faster version of the following function:

``````> in.interval <- function(x, lo, hi) (x > lo & x < hi)
> in.interval(c(2,4,6), 3, 5)
[1] FALSE  TRUE FALSE
``````

The problem here is that `x` has to be touched twice, and the computation consumes twice the memory compared to a more efficient approach. Internally, I would assume it to work like this:

1. Compute `tmp1 <- (x > lo)`
2. Compute `tmp2 <- (x < hi)`
3. Compute `retval <- tmp1 & tmp2`

Now, after step 2, two Boolean vectors are in memory, and the `x` had to be looked at twice. My question is: Is there a (built-in?) function that does all of this in one step, without allocating the extra memory?

Following up this question: R: Select values from data table in range

EDIT: I have set up a Gist based on CauchyDistributedRV's answer at https://gist.github.com/4344844

-
For 1e8 values, the function needs about 12 seconds on my computer. How much faster do you want it to go? And how exactly are you going to check 2 conditions by accessing x only once? Can you point us towards the 'more efficient approach' you had in mind? –  Joris Meys Dec 20 '12 at 10:57
@JorisMeys: About 6 seconds would be good :-) Will edit the question later. –  krlmlr Dec 20 '12 at 10:59
Maybe `findInterval` for a vectorized version of your question? –  Martin Morgan Dec 20 '12 at 12:12
@JorisMeys `abs(x-(hi+lo)/2)-(hi-lo)/2 < 0` –  James Dec 20 '12 at 12:19
@James Thx. I figured it out already, but was hoping OP would do an effort using the grey matter that fills his/her head :). As you put it in a comment, you can give the answer too if you want. –  Joris Meys Dec 20 '12 at 12:23

As @James said in the comments, the trick is to substract the middle between low and high from x, and then check whether that difference is less than half of the distance between low and high. Or, in code :

``````in.interval2 <- function(x, lo, hi) {
abs(x-(hi+lo)/2) < (hi-lo)/2
}
``````

That's about as fast as the `.bincode` hack, and is the implementation of the algorithm you were looking for. You can translate this to C or C++ and try if you get a speedup.

Comparison with other solutions:

``````x <- runif(1e6,1,10)
require(rbenchmark)
benchmark(
in.interval(x, 3, 5),
in.interval2(x, 3, 5),
findInterval(x, c(3, 5)) == 1,
!is.na(.bincode(x, c(3, 5))),
order='relative',
columns=c("test", "replications", "elapsed", "relative")
)
``````

gives

``````                           test replications elapsed relative
4  !is.na(.bincode(x, c(3, 5)))          100    1.88    1.000
2         in.interval2(x, 3, 5)          100    1.95    1.037
3 findInterval(x, c(3, 5)) == 1          100    3.42    1.819
1          in.interval(x, 3, 5)          100    3.54    1.883
``````
-
The idea is sweet, but on my machine it's considerably slower than `.bincode`, and the Rcpp version behaves just like the best other Rcpp version that uses `&` internally. See the Gist for results (there it's test 7 and 8). –  krlmlr Dec 20 '12 at 13:10
What about `(x-lo)*(hi-x) > 0`? –  Roland Dec 20 '12 at 13:18
@Roland: `(x-lo)*(x-hi) <= 0` might be even better. But I think I'll settle for `.bincode` unless someome comes up with an even faster option. –  krlmlr Dec 20 '12 at 13:22
While I'm at it: Both your and Roland's approaches do not seem to allow testing left-inclusive-right-exclusive (or the other way round). `.bincode` can do everything except left-exclusive-right-exclusive (with the help of the `include.lowest` parameter). –  krlmlr Dec 20 '12 at 13:26
True that indeed. But left-inclusive right-exclusive cannot be tested in one go, as you cannot rewrite the conditions into one condition. To do this, you need to treat both sides the same way (either inclusive or exclusive) –  Joris Meys Dec 20 '12 at 16:13

`findInterval` is faster than `in.interval` for long x.

``````library(microbenchmark)

set.seed(123L)
x <- runif(1e6, 1, 10)
in.interval <- function(x, lo, hi) (x > lo & x < hi)

microbenchmark(
findInterval(x, c(3, 5)) == 1L,
in.interval(x, 3, 5),
times=100)
``````

with

``````Unit: milliseconds
expr      min       lq   median       uq      max
1 findInterval(x, c(3, 5)) == 1L 23.40665 25.13308 25.17272 25.25361 27.04032
2           in.interval(x, 3, 5) 42.91647 45.51040 45.60424 45.75144 46.38389
``````

Faster still if `== 1L` is not needed, and useful if the 'intervals' to be found are more than 1

``````> system.time(findInterval(x, 0:10))
user  system elapsed
3.644   0.112   3.763
``````

If speed is of the essence, this C implementation is fast though intolerant of, e.g., integer rather than numeric arguments

``````library(inline)
in.interval_c <- cfunction(c(x="numeric", lo="numeric", hi="numeric"),
'    int len = Rf_length(x);
double lower = REAL(lo)[0], upper = REAL(hi)[0],
*xp = REAL(x);
SEXP out = PROTECT(NEW_LOGICAL(len));
int *outp = LOGICAL(out);

for (int i = 0; i < len; ++i)
outp[i] = (xp[i] - lower) * (xp[i] - upper) <= 0;

UNPROTECT(1);
return out;')
``````

Timings for some solutions presented in other answers are

``````microbenchmark(
findInterval(x, c(3, 5)) == 1L,
in.interval.abs(x, 3, 5),
in.interval(x, 3, 5),
in.interval_c(x, 3, 5),
!is.na(.bincode(x, c(3, 5))),
times=100)
``````

with

``````Unit: milliseconds
expr       min        lq    median        uq
1 findInterval(x, c(3, 5)) == 1L 23.419117 23.495943 23.556524 23.670907
2       in.interval.abs(x, 3, 5) 12.018486 12.056290 12.093279 12.161213
3         in.interval_c(x, 3, 5)  1.619649  1.641119  1.651007  1.679531
4           in.interval(x, 3, 5) 42.946318 43.050058 43.171480 43.407930
5   !is.na(.bincode(x, c(3, 5))) 15.421340 15.468946 15.520298 15.600758
max
1 26.360845
2 13.178126
3  2.785939
4 46.187129
5 18.558425
``````

Revisiting the speed issue, in a file bin.cpp

``````#include <Rcpp.h>

using namespace Rcpp;

// [[Rcpp::export]]
SEXP bin1(SEXP x, SEXP lo, SEXP hi)
{
const int len = Rf_length(x);
const double lower = REAL(lo)[0], upper = REAL(hi)[0];
SEXP out = PROTECT(Rf_allocVector(LGLSXP, len));

double *xp = REAL(x);
int *outp = LOGICAL(out);
for (int i = 0; i < len; ++i)
outp[i] = (xp[i] - lower) * (xp[i] - upper) <= 0;

UNPROTECT(1);
return out;
}

// [[Rcpp::export]]
LogicalVector bin2(NumericVector x, NumericVector lo, NumericVector hi)
{
NumericVector xx(x);
double lower = as<double>(lo);
double upper = as<double>(hi);

LogicalVector out(x);
for( int i=0; i < out.size(); i++ )
out[i] = ( (xx[i]-lower) * (xx[i]-upper) ) <= 0;

return out;
}

// [[Rcpp::export]]
LogicalVector bin3(NumericVector x, const double lower, const double upper)
{
const int len = x.size();
LogicalVector out(len);

for (int i=0; i < len; i++)
out[i] = ( (x[i]-lower) * (x[i]-upper) ) <= 0;

return out;
}
``````

with timings

``````> library(Rcpp)
> sourceCpp("bin.cpp")
> microbenchmark(bin1(x, 3, 5), bin2(x, 3, 5), bin3(x, 3, 5),
+                in.interval_c(x, 3, 5), times=1000)
Unit: milliseconds
expr       min        lq    median        uq      max
1          bin1(x, 3, 5)  1.546703  2.668171  2.785255  2.839225 144.9574
2          bin2(x, 3, 5) 12.547456 13.583808 13.674477 13.792773 155.6594
3          bin3(x, 3, 5)  2.238139  3.318293  3.357271  3.540876 144.1249
4 in.interval_c(x, 3, 5)  1.545139  2.654809  2.767784  2.822722 143.7500
``````

with about equal parts speed-up coming from use of a constant `len` instead of `out.size()` as the loop bound, and allocating the logical vector without initializing it (`LogicalVector(len)`, since it will be initialized in the loop).

-
I've embedded your solution into the gist at gist.github.com/4344844 . For 1e6 elements it works faster than the `&` approach, however using C++ still beats it by a factor of two. –  krlmlr Dec 20 '12 at 12:31
Wow. The C solution just beats everything. I wonder why. –  krlmlr Dec 20 '12 at 20:06
duplication of large objects in Rcpp –  Martin Morgan Dec 20 '12 at 20:23
Now here's something baffling to me. The C solution you gave actually runs faster (about 2x) than a simple `x < hi` on my system (try adding `x > lo & x < hi`, `x < hi` to the benchmarks to see). How is that happening - I would think the underlying C implementation of operators in R would already be quite optimized? Or are the binary versions of R compiled in a 'safe' way compared to whatever might be going on when I compile that C function? –  Kevin Ushey Dec 20 '12 at 22:15
@CauchyDistributedRV `x < hi` requires allocation of the same amount of memory (for the return logical) as my code, both functions need to iterate over all values, and likely the C compiler has optimized the body of my `for` loop to be many fewer operations than implied by the high-level syntax, so possibly the basic cost of the two loops is comparable. R will also do a lot of things we take for granted, e.g., dealing with NAs, recycling `hi` (in general, not just for the special case of length 1), checking for the need to coerce between data types, etc. –  Martin Morgan Dec 21 '12 at 1:29

The main speedup I can find is through byte-compiling the function. Even an Rcpp solution (albeit using Rcpp sugar, and not a more drilled-down C solution) is slower than the compiled solution.

``````library( compiler )
library( microbenchmark )
library( inline )

in.interval <- function(x, lo, hi) (x > lo & x < hi)
in.interval2 <- cmpfun( in.interval )
in.interval3 <- function(x, lo, hi) {
sapply( x, function(xx) {
xx > lo && xx < hi }
)
}
in.interval4 <- cmpfun( in.interval3 )
in.interval5 <- rcpp( signature(x="numeric", lo="numeric", hi="numeric"), '
NumericVector xx(x);
double lower = Rcpp::as<double>(lo);
double upper = Rcpp::as<double>(hi);

return Rcpp::wrap( xx > lower & xx < upper );
')

x <- c(2, 4, 6)
lo <- 3
hi <- 5

microbenchmark(
in.interval(x, lo, hi),
in.interval2(x, lo, hi),
in.interval3(x, lo, hi),
in.interval4(x, lo, hi),
in.interval5(x, lo, hi)
)
``````

gives me

``````Unit: microseconds
expr    min      lq  median      uq    max
1  in.interval(x, lo, hi)  1.575  2.0785  2.5025  2.6560  7.490
2 in.interval2(x, lo, hi)  1.035  1.4230  1.6800  2.0705 11.246
3 in.interval3(x, lo, hi) 25.439 26.2320 26.7350 27.2250 77.541
4 in.interval4(x, lo, hi) 22.479 23.3920 23.8395 24.3725 33.770
5 in.interval5(x, lo, hi)  1.425  1.8740  2.2980  2.5565 21.598
``````

EDIT: Following other comments, here's an even faster Rcpp solution, using the tricks with absolute values given:

``````library( compiler )
library( inline )
library( microbenchmark )

in.interval.oldRcpp <- rcpp(
signature(x="numeric", lo="numeric", hi="numeric"), '
NumericVector xx(x);
double lower = Rcpp::as<double>(lo);
double upper = Rcpp::as<double>(hi);

return Rcpp::wrap( (xx > lower) & (xx < upper) );
')

in.interval.abs <- rcpp(
signature(x="numeric", lo="numeric", hi="numeric"), '
NumericVector xx(x);
double lower = as<double>(lo);
double upper = as<double>(hi);

LogicalVector out(x);
for( int i=0; i < out.size(); i++ ) {
out[i] = ( (xx[i]-lower) * (xx[i]-upper) ) <= 0;
}
return wrap(out);
')

in.interval.abs.sugar <- rcpp(
signature( x="numeric", lo="numeric", hi="numeric"), '
NumericVector xx(x);
double lower = as<double>(lo);
double upper = as<double>(hi);

return wrap( ((xx-lower) * (xx-upper)) <= 0 );
')

x <- runif(1E5)
lo <- 0.5
hi <- 1

microbenchmark(
in.interval.oldRcpp(x, lo, hi),
in.interval.abs(x, lo, hi),
in.interval.abs.sugar(x, lo, hi)
)

all.equal( in.interval.oldRcpp(x, lo, hi), in.interval.abs(x, lo, hi) )
all.equal( in.interval.oldRcpp(x, lo, hi), in.interval.abs.sugar(x, lo, hi) )
``````

gives me

``````1       in.interval.abs(x, lo, hi)  662.732  666.4855  669.939  690.6585 1580.707
2 in.interval.abs.sugar(x, lo, hi)  722.789  726.0920  728.795  742.6085 1671.093
3   in.interval.oldRcpp(x, lo, hi) 1870.784 1876.4890 1892.854 1935.0445 2859.025

> all.equal( in.interval.oldRcpp(x, lo, hi), in.interval.abs(x, lo, hi) )
[1] TRUE

> all.equal( in.interval.oldRcpp(x, lo, hi), in.interval.abs.sugar(x, lo, hi) )
[1] TRUE
``````
-
Did you check what your functions return? They aren't the same; `&&` only evaluates the first elements of its operands. –  Hong Ooi Dec 20 '12 at 11:06
Oops - you're exactly right. One could imagine wrapping the call within `sapply` or `map` but that's still slower than other solutions. –  Kevin Ushey Dec 20 '12 at 11:22
I have put your code into a gist: gist.github.com/4344844. However, it does not compile on my system (Ubuntu 12.10, latest R from CRAN): `Error in compileCode(f, code, language = language, verbose = verbose) : ...`, `error: no match for ‘operator&’ in ...` –  krlmlr Dec 20 '12 at 11:46
@user946850 are you using the most up-to-date version of `Rcpp`? I believe that the `&` operator was added as syntactic sugar in Rcpp 0.10.0; see cran.r-project.org/web/packages/Rcpp/vignettes/Rcpp-sugar.pdf . FWIW, it compiles fine with me on Mac OS, R 2.15.2, Rcpp_0.10.1 . –  Kevin Ushey Dec 20 '12 at 11:51
@user946850 I added a potential solution to the gist. Should compile with pre-0.10 Rcpp versions, but may be a tiny bit slower. Alternatively, you should be able to get the newest version from CRAN with `install.packages("Rcpp", type="source")` in an R session, I would imagine. –  Kevin Ushey Dec 20 '12 at 12:09

If you can deal with `NA`s, you could use `.bincode`:

``````.bincode(c(2,4,6), c(3, 5))
[1] NA  1 NA

library(microbenchmark)
set.seed(42)
x = runif(1e8, 1, 10)
microbenchmark(in.interval(x, 3, 5),
findInterval(x,  c(3, 5)),
.bincode(x, c(3, 5)),
times=5)

Unit: milliseconds
expr       min        lq    median       uq      max
1     .bincode(x, c(3, 5))  930.4842  934.3594  955.9276 1002.857 1047.348
2 findInterval(x, c(3, 5)) 1438.4620 1445.7131 1472.4287 1481.380 1551.419
3     in.interval(x, 3, 5) 2977.8460 3046.7720 3075.8381 3182.013 3288.020
``````
-
sweet use of internal functions. You get the answer by `!is.na(.bincode(...))` –  Joris Meys Dec 20 '12 at 12:39
`.bincode` converts its argument to integer so has surprising (in the present context) results -- `.bincode(3.1, 3, 5)` is 'NA'; test identity of results from each method. –  Martin Morgan Dec 20 '12 at 12:45
@MartinMorgan `.bincode(3.1, c(3, 5))` –  Roland Dec 20 '12 at 12:49
oops my bad, sorry about that. –  Martin Morgan Dec 20 '12 at 12:53
Works fine for flats, and is just slightly slower than the Rcpp-ed solution. Results in the Gist. –  krlmlr Dec 20 '12 at 12:56