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The language I'm using is R, but you don't necessarily need to know about R to answer the question.

Question: I have a sequence that can be considered the ground truth, and another sequence that is a shifted version of the first, with some missing values. I'd like to know how to align the two.


I have a sequence ground.truth that is basically a set of times:

ground.truth <- rep( seq(1,by=4,length.out=10), 5 ) +
                rep( seq(0,length.out=5,by=4*10+30), each=10 )

Think of ground.truth as times where I'm doing the following:

{take a sample every 4 seconds for 10 times, then wait 30 seconds} x 5

I have a second sequence observations, which is ground.truth shifted with 20% of the values missing:

nSamples <- length(ground.truth)
idx_to_keep <- sort(sample( 1:nSamples, .8*nSamples ))
theLag <- runif(1)*100
observations <- ground.truth[idx_to_keep] + theLag
nObs     <- length(observations)

If I plot these vectors this is what it looks like (remember, think of these as times):

enter image description here

What I've tried. I want to:

  • calculate the shift (theLag in my example above)
  • calculate a vector idx such that ground.truth[idx] == observations - theLag

First, assume we know theLag. Note that ground.truth[1] is not necessarily observations[1]-theLag. In fact, we have ground.truth[1] == observations[1+lagI]-theLag for some lagI.

To calculate this, I thought I'd use cross-correlation (ccf function).

However, whenever I do this I get a lag with a max. cross-correlation of 0, meaning ground.truth[1] == observations[1] - theLag. But I've tried this in examples where I've explicitly made sure that observations[1] - theLag is not ground.truth[1] (i.e. modify idx_to_keep to make sure it doesn't have 1 in it).

The shift theLag shouldn't affect the cross-correlation (isn't ccf(x,y) == ccf(x,y-constant)?) so I was going to work it out later.

Perhaps I'm misunderstanding though, because observations doesn't have as many values in it as ground.truth? Even in the simpler case where I set theLag==0, the cross correlation function still fails to identify the correct lag, which leads me to believe I'm thinking about this wrong.

Does anyone have a general methodology for me to go about this, or know of some R functions/packages that could help?

Thanks a lot.

share|improve this question
Post the code that you're using for the correlation. If you're correlating them value-by-value, it is certainly not going to give the results that you want. –  Matthew Lundberg Apr 19 '12 at 3:20
As mentioned in the question, I'm using ccf: ccf(ground.truth, observations). I think I'm not getting what I want since these are of different lengths due to the missing values. –  mathematical.coffee Apr 19 '12 at 3:49

2 Answers 2

up vote 5 down vote accepted

For the lag, you can compute all the differences (distances) between your two sets of points:

diffs <- outer(observations, ground.truth, '-')

Your lag should be the value that appears length(observations) times:

which(table(diffs) == length(observations))
# 55.715382960625 
#              86 

Double check:

# [1] 55.71538

The second part of your question is easy once you have found theLag:

idx <- which(ground.truth %in% (observations - theLag))
share|improve this answer
I absolutely love the sheer simplicity of this, but sadly I presented a slightly easier version of my actual question; because of limited precision in measuring the time stamps for both ground.truth and observations, theLag is not really constant over the entire series. It oscillates between n seconds and n+1 fairly unpredictably. I'm trying to modify your technique to see if I can still make it work though, because I just didn't think about it like that! –  mathematical.coffee Apr 19 '12 at 4:01
You, Sir/Madam, are a genius. I would never have thought to think about it like that and have been banging my head against the wall so hard I almost made a hole in it! Since I don't have an exactly-constant shift, I did which.min(abs(table(diffs)-length(observations))) for theLag, and hence instead of using %in% I used idx <- vapply( recons, function(t) which.min(abs(ground.truth-t)), -1). –  mathematical.coffee Apr 19 '12 at 4:25

The following should work if your time series are not too long.

You have two vectors of time-stamps, the second one being a shifted and incomplete copy of the first, and you want to find by how much it was shifted.

# Sample data
n <- 10
x <- cumsum(rexp(n,.1))
theLag <- rnorm(1)
y <- theLag + x[sort(sample(1:n, floor(.8*n)))]

We can try all possible lags and, for each one, compute how bad the alignment is, by matching each observed timestamp with the closest "truth" timestamp.

# Loss function
f <- function(u) {
  # Put all the values in a data.frame
  d1 <- data.frame(g="truth",    value=x)
  d2 <- data.frame(g="observed", value=y+u)
  d <- rbind(d1,d2)
  # For each observed value, find the next truth value
  # (we could take the nearest, on either side, 
  # but it would be more complicated)
  d <- sqldf("
    SELECT A.g, A.value, 
           ( SELECT MIN(B.value) 
             FROM   d AS B 
             WHERE  B.g='truth' 
             AND    B.value >= A.value
           ) AS next
    FROM   d AS A
    WHERE  A.g = 'observed'
  # If u is greater than the lag, there are missing values.
  # If u is smaller, the differences decrease 
  # as we approach the lag.
  if(any(is.na(d))) {
  } else {
    return( sum(d$`next` - d$value, na.rm=TRUE) )

We can now search for the best lag.

# Look at the loss function
sapply( seq(-2,2,by=.1), f )

# Minimize the loss function.
# Change the interval if it does not converge, 
# i.e., if it seems in contradiction with the values above
# or if the minimum is Inf
(r <- optimize(f, c(-3,3)))
theLag # Same value, most of the time
share|improve this answer
Thanks a lot for the work that has obviously gone in to this, I hadn't thought about this in an optimisation sense either (my attempts were all in the vein of manipulating the periodicity of the times (every 4(ish) seconds 10 times with a 30(ish) second gap) to align the two sequences). You answer does work too (and with theLag I can calculate idx), but I'll accept @flodel's because of its pure simplicity. Thanks! –  mathematical.coffee Apr 19 '12 at 4:29

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