Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

I'm running an R script on UNIX based system , the script contain multiplication of large numbers , so the results where NAs by integer overflow , but when i run the same script on windows , this problem does not appears.

but i should keep the script working the whole night on the Desktop(which is Unix).

is there any solution for this problem?


for(ol in seq(1,nrow(yi),by=25))
    for(oh in seq(1,nrow(yi),by=25))

        A=(N*(ol^2)) + ((N*(N+1)*(2*N+1))/6) -(2*ol*((N*N+1)/2)) + (2*N*ol*(N-oh+1)) + ((N-oh+1)*N^2) + (2*N*(oh-N-1)*(oh+N))


    with :
N=16569 = nrow(yi)

but first round is not being calculated on unix.

share|improve this question
Some sample code illustrating the problem would be nice. You'll have to give the specifications for both systems as well: Are they 32bit, 64bit, which Windows and Linux are we talking about, ... – Joris Meys May 18 '11 at 9:58
@Joris Meys : the windows is windows 7 64 bit , and the linux is fedora 32 bit. – weblover May 18 '11 at 10:11
@weblover : can you give us two numbers that -as integer- multiplied on the UNIX give an overflow, but not on Windows? I fail to find some, but we run debian 64bit on our server. – Joris Meys May 18 '11 at 10:58
@Joris Meys : the resulted value is something like this : -30598395869593930593 (on windows) but on unix it's not like this , it's NAs – weblover May 18 '11 at 12:15
@weblover : rather strange, as I cannot store that number as an integer in R on windows, neither in the 32bit nor in the 64bit version. I get NA in both cases. Even more, if I store it as double and ask format(x,scientific=FALSE), I get another number. – Joris Meys May 18 '11 at 12:18

3 Answers 3

As the other answers have pointed out, there is something a bit non-reproducible/strange about your results so far. Nevertheless, if you really must do exact calculations on large integers, you probably need an interface between R and some other system.

Some of your choices are:

  • the gmp package (see this page and scroll down to R
  • an interface to the bc calculator on googlecode
  • there is a high precision arithmetic page on the R wiki which compares interfaces to Yacas, bc, and MPFR/GMP
  • there is a limited interface to the PARI/GP package in the elliptical package, but this is probably (much) less immediately useful than the preceding three choices

    Most Unix or Cygwin systems should have bc installed already. GMP and Yacas are easy to install on modern Linux systems ...

Here's an extended example, with a function that can choose among numeric, integer, or bigz computation.

f1 <- function(ol=1L,oh=1L,N=16569L,type=c("num","int","bigz")) {
  type <- match.arg(type)
  ## convert all values to appropriate type
  if (type=="int") {
    ol <- as.integer(ol)
    oh <- as.integer(oh)
    N <- as.integer(N)
    one <- 1L
    two <- 2L
    six <- 6L
    cc <- as.integer
  } else if (type=="bigz") {
    one <- as.bigz(1)
    two <- as.bigz(2)
    six <- as.bigz(6)
    N <- as.bigz(N)
    ol <- as.bigz(ol)
    oh <- as.bigz(oh)
    cc <- as.bigz
  } else {
    one <- 1
    two <- 2
    six <- 6
    N <- as.numeric(N)
    oh <- as.numeric(oh)
    ol <- as.numeric(ol)
    cc <- as.numeric
  ## if using bigz mode, the ratio needs to be converted back to bigz;
  ## defining cc() as above seemed to be the most transparent way to do it
  N*ol^two + cc(N*(N+one)*(two*N+one)/six) -
    ol*(N*N+one) + two*N*ol*(N-oh+one) +
      (N-oh+one)*N^two + two*N*(oh-N-one)*(oh+N)

I removed a lot of unnecessary parentheses, which actually made it harder to see what was going on. It is indeed true that for the (1,1) case the final result is not bigger than .Machine$integer.max but some of the intermediate steps are ... (for the (1,1) case this actually reduces to $$-1/6*(N+2)*(4*N^2-5*N+3)$$ ...)

f1()  ##  -3.032615e+12
f1() > .Machine$integer.max  ## FALSE
N <- 16569L
N*(N+1)*(2*N+1) > .Machine$integer.max   ## TRUE
N*(N+1L)*(2L*N+1L)  ## integer overflow (NA)
f1(type="int")      ## integer overflow
f1(type="bigz")     ##  "-3032615078557"
print(f1(),digits=20)  ##  -3032615078557: no actual loss of precision in this case

PS: you have a (N*N+1) term in your equation. Should that really be N*(N+1), or did you really mean N^2+1?

share|improve this answer
ok , thanks for your help , i'll try it – weblover May 19 '11 at 11:09

Given your comments, I guess that you seriously misunderstand the "correctness" of numbers in R. You say the outcome you get on Windows is something like -30598395869593930593. Now, on both 32bit and 64bit that precision is even not possible using a double, let alone using an integer :

> x <- -30598395869593930593
> format(x,scientific=F)
[1] "-30598395869593931776"
> all.equal(x,as.numeric(format(x,scientific=F)))
[1] TRUE
> as.integer(x)
[1] NA

You have 16 digits you can trust, all the rest is bollocks. Then again, an accuracy of 16 digits is already pretty strong. Most measurement tools don't even come close to that.

share|improve this answer
@Joris Meys : there is no solution to handle this amount of digits ?? – weblover May 18 '11 at 12:46
@weblover : it's the maximum precision for type double, so... – Joris Meys May 18 '11 at 12:56
@Joris Meys: that's the exact value i'm getting on windows , but NAs on UNIX :[1] "-3032615078557" , is this can be fixed on UNIX ?? – weblover May 18 '11 at 13:05
@weblover : which part of "give us reproducible code" do you not understand? How can I know if I can't reproduce what you tell us? – Joris Meys May 18 '11 at 13:24
@Joris Meys : i updated my question , and added 1 formula that have the problem. – weblover May 18 '11 at 13:43

Can you cast your integers to floating-point numbers in order to use floating-point math for the computations?

For example:

> x=as.integer(1000000)
> x*x
[1] NA
Warning message:
In x * x : NAs produced by integer overflow
> x=as.numeric(1000000)
> x*x
[1] 1e+12

As an aside, it is not entirely clear why the warning would appear in one environment but not the other. I first thought that 32-bit and 64-bit builds of R might be using 32-bit and 64-bit integers respectively, but that doesn't appear to be the case. Are both your environments configured identically in terms of how warnings are displayed?

share|improve this answer
i don't know how the environments are configured , but the option that you suggested change anything in the values ?? because i need accurate values at the end of the calculation. – weblover May 18 '11 at 10:10
@weblover: Floating-point math has the potential of giving you approximate results where integer math is exact. If I were you, I'd try to figure out the exact cause of the integer overflow, and take it from there. – NPE May 18 '11 at 10:12
i kni=ow exactly where is it , but i can't take it out , it's inside the mathematical calculations – weblover May 18 '11 at 11:05
@weblover : if it needs to be exact, remember that x*y = exp(log(x)+log(y)). Working with log values can give you more accuracy. – Joris Meys May 18 '11 at 11:15

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

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