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I'm looking for a computationally efficient way to find local maxima/minima for a large list of numbers in R. Hopefully without for loops...

For example, if I have a datafile like 1 2 3 2 1 1 2 1, I want the function to return 3 and 7, which are the positions of the local maxima.

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1  
    
This function by Tim Poisot is handy for noisy series: rtricks.wordpress.com/2009/05/03/… –  Noam Ross Feb 18 at 19:56

6 Answers 6

diff(diff(x)) essentially computes the discrete analogue of the second derivative, so should be negative at local maxima. The +1 below takes care of the fact that the result of diff is shorter than the input vector.

edit: added @Tommy's correction for cases where delta-x is not 1...

tt <- c(1,2,3,2,1, 1, 2, 1)
which(diff(sign(diff(tt)))==-2)+1

My suggestion above ( http://finzi.psych.upenn.edu/R/library/ppc/html/ppc.peaks.html ) is intended for the case where the data are noisier.

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You beat me by a few seconds - and with a better solution :) But it should be which(diff(sign(diff(x)))==-2)+1 if the values aren't always changing by one. –  Tommy Jul 26 '11 at 21:07

@Ben's solution is pretty sweet. It doesn't handle the follwing cases though:

# all these return numeric(0):
x <- c(1,2,9,9,2,1,1,5,5,1) # duplicated points at maxima 
which(diff(sign(diff(x)))==-2)+1 
x <- c(2,2,9,9,2,1,1,5,5,1) # duplicated points at start
which(diff(sign(diff(x)))==-2)+1 
x <- c(3,2,9,9,2,1,1,5,5,1) # start is maxima
which(diff(sign(diff(x)))==-2)+1

Here's a more robust (and slower, uglier) version:

localMaxima <- function(x) {
  # Use -Inf instead if x is numeric (non-integer)
  y <- diff(c(-.Machine$integer.max, x)) > 0L
  rle(y)$lengths
  y <- cumsum(rle(y)$lengths)
  y <- y[seq.int(1L, length(y), 2L)]
  if (x[[1]] == x[[2]]) {
    y <- y[-1]
  }
  y
}

x <- c(1,2,9,9,2,1,1,5,5,1)
localMaxima(x) # 3, 8
x <- c(2,2,9,9,2,1,1,5,5,1)
localMaxima(x) # 3, 8
x <- c(3,2,9,9,2,1,1,5,5,1)
localMaxima(x) # 1, 3, 8
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thanks I tried this code, and it works! How do you modify this for local-minima without changing the input? –  Vahid Mir Sep 19 at 14:10

Use the zoo library function rollapply:

x <- c(1, 2, 3, 2, 1, 1, 2, 1)
library(zoo)
 xz <- as.zoo(x)
 rollapply(xz, 3, function(x) which.min(x)==2)
#    2     3     4     5     6     7 
#FALSE FALSE FALSE  TRUE FALSE FALSE 
 rollapply(xz, 3, function(x) which.max(x)==2)
#    2     3     4     5     6     7 
#FALSE  TRUE FALSE FALSE FALSE  TRUE 

Then pull the index using the 'coredata' for those values where 'which.max' is a "center value" signaling a local maximum. You could obviously do the same for local minima using which.min instead of which.max.

 rxz <- rollapply(xz, 3, function(x) which.max(x)==2)
 index(rxz)[coredata(rxz)]
#[1] 3 7

I am assuming you do not want the starting or ending values, but if you do , you could pad the ends of your vectors before processing, rather like telomeres do on chromosomes.

(I'm noting the ppc package ("Peak Probability Contrasts" for doing mass spectrometry analyses, simply because I was unaware of its availability until reading @BenBolker's comment above, and I think adding these few words will increase the chances that someone with a mass-spec interest will see this on a search.)

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This has a very significant advantage over the others. By increasing the interval to something larger than 3, we can ignore cases where one point happens to be very slightly higher than its two nearest neighbors even though there are other nearby points larger. This can be useful for measured data with small, random variations. –  jpmc26 May 9 '13 at 0:41
    
Thanks for the comment, and thanks to dbaupp, and credit to @GGrothendieck and Achim Zeileis for writing zoo so cleanly that I am able to apply it cleanly. –  BondedDust Jun 21 '13 at 18:29

There are some good solutions provided, but it depends on what you need.

Just diff(tt) returns the differences.

You want to detect when you go from increasing values to decreasing values. One way to do this is provided by @Ben:

 diff(sign(diff(tt)))==-2

The problem here is that this will only detect changes that go immediately from strictly increasing to strictly decreasing.

A slight change will allow for repeated values at the peak (returning TRUE for last occurence of the peak value):

 diff(diff(x)>=0)<0

Then, you simply need to properly pad the front and back if you want to detect maxima at the beginning or end of

Here's everything wrapped in a function (including finding of valleys):

 which.peaks <- function(x,partial=TRUE,decreasing=FALSE){
     if (decreasing){
         if (partial){
             which(diff(c(FALSE,diff(x)>0,TRUE))>0)
         }else {
             which(diff(diff(x)>0)>0)+1
         }
     }else {
         if (partial){
             which(diff(c(TRUE,diff(x)>=0,FALSE))<0)
         }else {
             which(diff(diff(x)>=0)<0)+1
         }
     }
 }
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Here's the solution for minima:

@Ben's solution

x <- c(1,2,3,2,1,2,1)
which(diff(sign(diff(x)))==+2)+1 # 5

Please regard the cases at Tommy's post!

@Tommy's solution:

localMinima <- function(x) {
  # Use -Inf instead if x is numeric (non-integer)
  y <- diff(c(.Machine$integer.max, x)) > 0L
  rle(y)$lengths
  y <- cumsum(rle(y)$lengths)
  y <- y[seq.int(1L, length(y), 2L)]
  if (x[[1]] == x[[2]]) {
    y <- y[-1]
  }
  y
}

x <- c(1,2,9,9,2,1,1,5,5,1)
localMinima(x) # 1, 7, 10
x <- c(2,2,9,9,2,1,1,5,5,1)
localMinima(x) # 7, 10
x <- c(3,2,9,9,2,1,1,5,5,1)
localMinima(x) # 2, 7, 10

Please regard: Neither localMaxima nor localMinima can handle duplicated maxima/minima at start!

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Not sure what your answer really brings to the table given other answers include same algorithms. –  m4rtin Sep 25 at 10:26
    
True, but it gives a solution for minima, such as originally asked. Plus the case of duplicated maxima/minima at start was not mentioned yet. –  Sebastian Sep 25 at 10:28
    
Well... I can't argue with that even if it's basically the same answer. So I won't downvote but not upvote either. You should try answering question not already answered (even if this one is not officially answered, the fact that the top 2 answer have 18 and 20 votes makes it the same). –  m4rtin Sep 25 at 10:34
    
By the way, I could need help finding a way to adapt the function for maxima/minima with bigger intervalls, so 'delta x > 1'. Anyone an idea? –  Sebastian Oct 27 at 7:48

I posted this elsewhere, but I think this is an interesting way to go about it. I'm not sure what its computational efficiency is, but it's a very concise way of solving the problem.

vals=rbinom(1000,20,0.5)

text=paste0(substr(format(diff(vals),scientific=TRUE),1,1),collapse="")

sort(na.omit(c(gregexpr('[ ]-',text)[[1]]+1,ifelse(grepl('^-',text),1,NA),
 ifelse(grepl('[^-]$',text),length(vals),NA))))
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