I currently am using the which.max() function in R within a loop. Sometimes, I have a vector which contains the same elements, like:

vec <- c(0,0,2,0,2)

The function will then always return:

> which.max(vec)
[1] 3

I am wondering if there is a simple solution to break ties randomly so that it doesn't always choose the smallest index among ties. I know that there is a which.is.max function in nnet, but was hoping to see if there was another simple solution without having to resort to installing extra packages. Thanks.

  • See ?max.col after converting "vec" to a 1-row matrix – alexis_laz Mar 30 '18 at 10:04

which(vec == max(vec)) will match all ties. You can then pick one at random using sample(which(vec == max(vec)), 1).

As you mentioned in the comments, sample does something annoying when the supplied vector is of length 1. So when there is only one maximum.

You can fix this as follows:

maxima <- which(vec == max(vec))
if(length(maxima) > 1){
  maxima <- sample(maxima, 1)
  • 3
    It seems that in the event when there is a clear maximum (i.e., only one value is the maximum, like c(0,0,1,0), this code then has sample(3,1), which will then sample from a pool of 1,2,3. Is there a way to prevent it from sampling when there is one distinct maximum? – user321627 Mar 30 '18 at 9:25
  • @user321627 edited. – JAD Mar 30 '18 at 10:10
  • Note that this is almost exactly the same implementation as that used by nnet::which.is.max. – Hugh Mar 30 '18 at 10:54
  • 1
    @Hugh that doesn't surprise me :P – JAD Mar 30 '18 at 11:23

Another method is using rank with ties.method = "random" and then we can use which.max on it.

which.max(rank(vec, ties.method = "random"))

which.max(rank(vec, ties.method = "random"))
#[1] 3

which.max(rank(vec, ties.method = "random"))
#[1] 5

rank would basically rank the vector according to their value and with ties.method = "random" it will randomly assign rank in case of a tie.

rank(vec, ties.method = "random")
#[1] 2 1 4 3 5

rank(vec, ties.method = "random")
#[1] 1 3 5 2 4
  • 2
    @downvoter something which I said is incorrect ? Would be happy to correct it :) – Ronak Shah Mar 30 '18 at 8:04
  • Not my downvote, but a potential concern with this method is that rank requires sorting the vector, which doesn't scale as nicely for larger vectors. – JAD Mar 30 '18 at 8:12
  • 1
    @JAD hmm..maybe, I am not sure how rank works internally. Haven't checked for efficiency and I doubt if that should be a potential reason for a dv especially when OP hasn't mentioned anything about efficiency at first place. Thanks anyway :) – Ronak Shah Mar 30 '18 at 8:17
  • I don't think so either, but just thought I'd mention it. – JAD Mar 30 '18 at 8:26

There is a concept called "pertubation", where you modify each number by a random amount that is significantly smaller than the existing variation. You can then take the maximum amount, which will be one of the original maxima plus some random amount. Which one of the original maxima will be selected is random, as it's determined by which had the largest random amount added. So for instance, if all your numbers are integers, you can convert them to floats, add a random number between 0 and .001, pick the largest one, and then round it back to int. This is probably not the most efficient method, but given that you mentioned the which.is.max in nnet, presumably you are doing work with neural networks, and pertubation is an important concept with NNs.


As alternative:

vec <- c(0,0,2,0,2)
vec %>% unique %>% sapply(function(x) which(x==vec)[sample(x=length(which(x==vec)),1)])

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.