11

What is the fastest way to extract the min from each column in a matrix?


EDIT:

Moved all the benchmarks to the answer below.

Using a Tall, Short or Wide Matrix:

  ##  TEST DATA
  set.seed(1)
  matrix.inputs <- list(
        "Square Matrix"     = matrix(sample(seq(1e6), 4^2*1e4, T), ncol=400),   #  400 x  400
        "Tall Matrix"       = matrix(sample(seq(1e6), 4^2*1e4, T), nrow=4000),  # 4000 x   40
        "Wide-short Matrix" = matrix(sample(seq(1e6), 4^2*1e4, T), ncol=4000),  #   40 x 4000
        "Wide-tall Matrix"  = matrix(sample(seq(1e6), 4^2*1e5, T), ncol=4000),   #  400 x 4000
        "Tiny Sq Matrix"    = matrix(sample(seq(1e6), 4^2*1e2, T), ncol=40)     #   40 x   40
  )
  • 1
    Benchmarks always get my +1. – Roman Luštrik Dec 3 '12 at 9:49
  • I think you should post this stuff as an answer, rather than as part of your question (I'd vote for it!) – Ben Bolker Dec 4 '12 at 21:14
  • @BenBolker, done. – Ricardo Saporta Dec 4 '12 at 21:30
9

Here is one that is faster on square and wide matrices. It uses pmin on the rows of the matrix. (If you know a faster way of splitting the matrix into its rows, please feel free to edit)

do.call(pmin, lapply(1:nrow(mat), function(i)mat[i,]))

Using the same benchmark as @RicardoSaporta:

$`Square Matrix`
          test elapsed relative
3 pmin.on.rows   1.370    1.000
1          apl   1.455    1.062
2         cmin   2.075    1.515

$`Wide Matrix`
      test elapsed relative
3 pmin.on.rows   0.926    1.000
2         cmin   2.302    2.486
1          apl   5.058    5.462

$`Tall Matrix`
          test elapsed relative
1          apl   1.175    1.000
2         cmin   2.126    1.809
3 pmin.on.rows   5.813    4.947
  • 1
    P.S.: I think you can even replace pmin with its 'internal' version pmin.int to get more speed out of it. – flodel Dec 3 '12 at 12:19
  • thanks a lot! pmin is exactly the function I was originally looking for. I knew such a function had to exist, but couldnt find it. well, almost exactly -- exactly pmin with the do.call..lapply built into it ;) – Ricardo Saporta Dec 3 '12 at 16:38
10

The sos package is great for answering these sorts of questions.

library("sos")
findFn("colMins")
library("matrixStats")
?colMins

http://finzi.psych.upenn.edu/R/library/matrixStats/html/rowRanges.html

Oddly enough, for the one example I tried colMins was slower. Perhaps someone can point out what's funny about my example?

set.seed(101); z <- matrix(runif(1e6),nrow=1000)
library(rbenchmark)
benchmark(colMins(z),apply(z,2,min))
##               test replications elapsed relative user.self sys.self
## 2 apply(z, 2, min)          100  14.290     1.00     7.216    7.057
## 1       colMins(z)          100  25.585     1.79    15.509    9.852
  • Two great answers in one!! Thank you Ben – Ricardo Saporta Dec 3 '12 at 3:54
  • 2
    ... interesting. I had a matrix with 5K+ columns, but only 10 rows. When I instead tried a 5k+ rows, apply is now faster – Ricardo Saporta Dec 3 '12 at 4:00
6

Update 2014-12-17:

colMins() et al. were made significantly faster in a recent version of matrixStats. Here's an updated benchmark summary using matrixStats 0.12.2 showing that it ("cmin") is ~5-20 times faster than the second fastest approach:

$`Square Matrix`
     test elapsed relative
2    cmin   0.216    1.000
1     apl   4.200   19.444
5 pmn.int   4.604   21.315
4     pmn   5.136   23.778
3    lapl  12.546   58.083

$`Tall Matrix`
     test elapsed relative
2    cmin   0.262    1.000
1     apl   3.006   11.473
5 pmn.int  18.605   71.011
3    lapl  22.798   87.015
4     pmn  27.583  105.279

$`Wide-short Matrix`
     test elapsed relative
2    cmin   0.346    1.000
5 pmn.int   3.766   10.884
4     pmn   3.955   11.431
3    lapl  13.393   38.708
1     apl  19.187   55.454

$`Wide-tall Matrix`
     test elapsed relative
2    cmin   5.591    1.000
5 pmn.int  39.466    7.059
4     pmn  40.265    7.202
1     apl  67.151   12.011
3    lapl 158.035   28.266

$`Tiny Sq Matrix`
     test elapsed relative
2    cmin   0.011    1.000
5 pmn.int   0.135   12.273
4     pmn   0.178   16.182
1     apl   0.202   18.364
3    lapl   0.269   24.455

Previous comment 2013-10-09:
FYI, since matrixStats v0.8.7 (2013-07-28), colMins() is roughly twice as fast as before. The reason is that the function previously utilized colRanges(), which explains the "surprisingly slow" results reported here. Same speed is seen for colMaxs(), rowMins() and rowMaxs().

3
lapply( split(mat, rep(1:dim(mat)[1], each=dim(mat)[2])), min)

which( ! apply(my.mat, 2, min, na.rm=T) ==
        sapply( split(my.mat, rep(1:dim(my.mat)[1], each=dim(my.mat)[2])), min) )
# named integer(0)
  • I see no reason why they would not be ordered in the same manner as would occur by column and my tests with smaller "ordering correctly" and provide a counter-example. – 42- Dec 3 '12 at 5:02
2

Below is a collection of the answers thus far. This will be updated as more answers are contributed.

BENCHMARKS

  library(rbenchmark)
  library(matrixStats)  # for colMins


  list.of.tests <- list (
        ## Method 1: apply()  [original]
        apl =expression(apply(mat, 2, min, na.rm=T)),

        ## Method 2:  matrixStats::colMins [contributed by @Ben Bolker ]
        cmin = expression(colMins(mat)),

        ## Method 3: lapply() + split()  [contributed by @DWin ]
        lapl = expression(lapply( split(mat, rep(1:dim(mat)[1], each=dim(mat)[2])), min)),

        ## Method 4: pmin() / pmin.int()  [contributed by @flodel ]
        pmn = expression(do.call(pmin, lapply(1:nrow(mat), function(i)mat[i,]))),
        pmn.int = expression(do.call(pmin.int, lapply(1:nrow(mat), function(i)mat[i,]))) #,

        ## Method 5: ????
        #  e5 = expression(  ???  ),
        )  


  (times <- 
        lapply(matrix.inputs, function(mat)
            do.call(benchmark, args=c(list.of.tests, replications=500, order="relative"))[, c("test", "elapsed", "relative")]
  ))



  ############################# 
  #$         RESULTS         $#
  #$_________________________$#
  #############################

  # $`Square Matrix`
  #      test elapsed relative
  # 5 pmn.int   2.842    1.000
  # 4     pmn   3.622    1.274
  # 1     apl   3.670    1.291
  # 2    cmin   5.826    2.050
  # 3    lapl  41.817   14.714  

  # $`Tall Matrix`
  #      test elapsed relative
  # 1     apl   2.622    1.000
  # 2    cmin   5.561    2.121
  # 5 pmn.int  11.264    4.296
  # 4     pmn  18.142    6.919
  # 3    lapl  48.637   18.550  

  # $`Wide-short Matrix`
  #      test elapsed relative
  # 5 pmn.int   2.909    1.000
  # 4     pmn   3.018    1.037
  # 2    cmin   6.361    2.187
  # 1     apl  15.765    5.419
  # 3    lapl  41.479   14.259  

  # $`Wide-tall Matrix`
  #      test elapsed relative
  # 5 pmn.int  20.917    1.000
  # 4     pmn  26.188    1.252
  # 1     apl  38.635    1.847
  # 2    cmin  64.557    3.086
  # 3    lapl 434.761   20.785  

  # $`Tiny Sq Matrix`
  #      test elapsed relative
  # 5 pmn.int   0.112    1.000
  # 2    cmin   0.149    1.330
  # 4     pmn   0.174    1.554
  # 1     apl   0.180    1.607
  # 3    lapl   0.509    4.545
  • Update 2014-12-17 in the HenrikB now makes the cmin solution the fastest. This wiki needs to be updated. – Daniel Krizian Feb 8 '16 at 15:49
  • plus there is possibly even faster base::max.col solution from @tennenrishin answer – Daniel Krizian Feb 8 '16 at 15:59
1

mat[(1:ncol(mat)-1)*nrow(mat)+max.col(t(-mat))] seems pretty fast, and it's base R.

  • Benchmark it for points. – c.gutierrez Jul 10 '14 at 15:57

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.