Quickest way of finding the index of an integer vector in a matrix in R

I have the following problem in R (for a Markov chain). Suppose there is a statespace matrix S with rows of unique integer vectors (states). I am given a vector s from this matrix, and want to determine the index of the row that corresponds to this vector. There are a couple of solutions:

1. A solution using `all.equal` as in:

``````which(apply(S,1,function(x){ isTRUE(all.equal(s,x)) }) )
``````
2. Map the vectors to a unique string and identify them with this string:

``````statecodes <- apply(S,1,function(x) paste(x,collapse=" ") )
check.equal <- function(s) {
z <- which(statecodes == paste(s, collapse=" "))
return(z)
}
check.equal(s)
``````

The first (often suggested) solution is downright terrible; it already takes 2.16 seconds for a state space of 16,000 vectors with length 4. The second solution is a lot faster, taking 0-0.01 seconds for the same state space. However, when the length of the vectors increases, it becomes increasingly slow. I feel that my string method is reasonable, but there must be something better. What would be a quicker way to make such comparisons?

For completeness sake, the state space for my problem could be generated as follows. If the vector has N elements, and I denotes the maximum that each element of a vector can attain (for example, 10) it is given by:

``````I <- rep(10,N)
S <- as.matrix(expand.grid( lapply(1:N, function(i) { 0:I[i]}) ) )
``````

How can the integrality of the states be exploited in order to make an as quick as possible comparison?

-
In your second solution, does the time it takes for the creation of the statecodes matter? That is, if you're doing lots of tests for each statespace, that part only needs to be done once and so could be slower. But if you're only doing only one test for each statespace, it needs to be done for each test anyway. The preferred solution is probably different depending on which condition you have. –  Aaron Jun 25 '12 at 14:02
I do these comparisons repeatedly, multiple times for each vector in the statespace matrix. Hence, the creation time for a vector of statecodes is not very important. I'm sacrificing a bit of time first, to be better off later on. Perhaps I should've mentioned that. So I'm looking for something that makes for the quickest possible search, disregarding the time for precomputations. –  Forzaa Jun 25 '12 at 14:16

One simple way of getting an integer value for each state is to cast the value to an integer and then multiply each column by the right base.

My version of that is `makecheck2`; the version using `paste` is `makecheck2`. I've also modified the `paste` version to use `match` so it can check multiple values at the same time. Both versions now return a function to be used to get the match.

The setup for my version is faster; 0.065 sec vs 1.552 sec.

``````N <- 5
I <- rep(10,N)
S <- as.matrix(expand.grid( lapply(1:N, function(i) { 0:I[i]}) ) )
system.time(f1 <- makecheck1(S))
#   user  system elapsed
#  1.547   0.000   1.552
system.time(f2 <- makecheck2(S))
#   user  system elapsed
#  0.063   0.000   0.065
``````

Here I test with 1 to 10000 values to check. The `paste` version is faster for small values; my version is faster for large values.

``````> set.seed(5)
> k <- lapply(0:4, function(idx) sample(1:nrow(S), 10^idx))
> s <- lapply(k, function(idx) S[idx,])
> t1 <- sapply(s, function(x) unname(system.time(for(i in 1:100) f1(x))[1]))
> t2 <- sapply(s, function(x) unname(system.time(for(i in 1:100) f2(x))[1]))
> data.frame(n=10^(0:4), time1=t1, time2=t2)
n time1 time2
1     1 0.761 1.512
2    10 0.772 1.523
3   100 0.857 1.552
4  1000 1.592 1.547
5 10000 9.651 1.848
``````

Code for both versions follow:

``````makecheck2 <- function(m) {
codes <- vector("list", length=ncol(m))
top <- vector("integer", length=ncol(m)+1)
top[1L] <- 1L
for(idx in 1:ncol(m)) {
codes[[idx]] <- unique(m[,idx])
top[idx+1L] <- top[idx]*length(codes[[idx]])
}
getcode <- function(x) {
out <- 0L
for(idx in 1:length(codes)) {
out <- out + top[idx]*match(x[,idx], codes[[idx]])
}
out
}
key <- getcode(m)
f <- function(x) {
if(!is.matrix(x)) {
x <- matrix(x, ncol=length(codes))
}
match(getcode(x), key)
}
rm(m) # perhaps there's a better way to remove these from the closure???
rm(idx)
f
}

makecheck1 <- function(m) {
n <- ncol(m)
statecodes <- apply(m,1,function(x) paste(x,collapse=" ") )
rm(m)
function(x) {
if(!is.matrix(x)) {
x <- matrix(x, ncol=n)
}
x <- apply(x, 1, paste, collapse=" ")
match(x, statecodes)
}
}
``````
-
PS. If your values are (smallish) integers and can be easily made non-negative this can be sped up because `match`ing with the unique values is then unnecessary. (where smallish may be necessary to avoid overflow) –  Aaron Jun 25 '12 at 16:05
PPS. Also, please check my math. I have a hunch I should have subtracted the result from match by one before multiplying by the base. –  Aaron Jun 25 '12 at 16:15
Also, I think this is basically what the link in the comments to @danas.zuokas's answer is doing. –  Aaron Jun 25 '12 at 16:41
Very helpful! I'll have a more thorough look at it tomorrow, but this seems to be just the thing I'm looking for. –  Forzaa Jun 25 '12 at 17:48
Yes, this works well! For single comparisons, `which` beats `match` by far, by the way, but for multiple `match` is faster. I'll have to rewrite my code a bit to make multiple comparisons. Thanks a lot for your help! –  Forzaa Jun 26 '12 at 10:59

One way to do this is `which(colSums(abs(t(S)-V))==0)` where `V` is a vector you are looking for.

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Shouldn't `V` be replaced with `matrix(V, nrow(S), ncol(S), byrow = TRUE)`? –  flodel Jun 25 '12 at 10:41
Thanks. Edited answer. –  danas.zuokas Jun 25 '12 at 10:47
Thanks for the tip. It works, but it seems to be slower than mapping vectors into a unique identifier (my 2nd method). I was thinking more of translating a vector into a unique integer, but don't know how yet. This comparison has to be done repeatedly, so it should be very fast and preferably not too memory intensive. –  Forzaa Jun 25 '12 at 11:05
Can you give numbers for performance comparison? –  danas.zuokas Jun 25 '12 at 11:06
Wow. Your solution is about six times faster. I wonder if it can be done faster. –  danas.zuokas Jun 25 '12 at 11:14