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I have two vectors of arbitrary and equal length

a <- c(0.8,0.8,0.8) 
b <- c(0.4,0.4,0.4)
n <- length(a)

From these I need to assemble an 2n by 2n matrix of the form:

x = [1-a1  b1    1-a2  b2    1-a3  b3
     a1    1-b1  a2    1-b2  a3    1-b3
     1-a1  b1    1-a2  b2    1-a3  b3
     a1    1-b1  a2    1-b2  a3    1-b3
     1-a1  b1    1-a2  b2    1-a3  b3
     a1    1-b1  a2    1-b2  a3    1-b3]

I currently do this using

x <- matrix(rep(as.vector(rbind(
                          c(1-a,a), 
                          c(b, 1-b))),
                n),
            ncol=n*2, byrow=TRUE)

How can I speed up this operation? Profiling indicates that matrix is taking the most time:

Rprof("out.prof")
for (i in 1:100000) {

x <- matrix(rep(as.vector(rbind(
  c(1-a,a), 
  c(b, 1-b))),
                n),
            ncol=n*2, byrow=TRUE)

}
Rprof(NULL)
summaryRprof("out.prof")

##$by.self
##            self.time self.pct total.time total.pct
##"matrix"         1.02    63.75       1.60    100.00
##"rbind"          0.24    15.00       0.36     22.50
##"as.vector"      0.18    11.25       0.54     33.75
##"c"              0.10     6.25       0.10      6.25
##"*"              0.04     2.50       0.04      2.50
##"-"              0.02     1.25       0.02      1.25
##
##$by.total
##            total.time total.pct self.time self.pct
##"matrix"          1.60    100.00      1.02    63.75
##"as.vector"       0.54     33.75      0.18    11.25
##"rbind"           0.36     22.50      0.24    15.00
##"c"               0.10      6.25      0.10     6.25
##"*"               0.04      2.50      0.04     2.50
##"-"               0.02      1.25      0.02     1.25
##
##$sample.interval
##[1] 0.02
##
##$sampling.time
##[1] 1.6
share|improve this question
    
Can we assume that all elements of a are equal to one another and that all elements of b are equal to one another? –  David J. Harris Nov 12 '12 at 20:20
    
No, the elements of a and b are not always equal. Thanks for clarifying –  Noam Ross Nov 12 '12 at 20:22
    
Also, what's n.classes? –  David J. Harris Nov 12 '12 at 20:28
    
Whoops. Should be n. Fixing. –  Noam Ross Nov 12 '12 at 20:30
    
Can I also assume that you actually care about performance on much bigger matrices, or is n == 3 an important use case for you? –  David J. Harris Nov 12 '12 at 20:45
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2 Answers

up vote 3 down vote accepted

I don't think there is an alternative to matrix being the slowest part of your profile, but you can definitely save a little time by optimizing the rest. For example:

x <- matrix(rbind(c(1-a,a), c(b, 1-b)), 2*n, 2*n, byrow=TRUE)

Also, although I would not recommend it, you can save a little extra time by using the Internal matrix function:

x <- .Internal(matrix(rbind(c(1-a,a), c(b, 1-b)),
                      n*2, n*2, TRUE, NULL, FALSE, FALSE))

Here are some benchmarks:

benchmark(
   method0 = matrix(rep(as.vector(rbind(c(1-a,a), c(b, 1-b))), n),
                    ncol=n*2, byrow=TRUE),
   method1 = matrix(rbind(c(1-a,a), c(b, 1-b)), 2*n, 2*n, byrow=TRUE),
   method2 = .Internal(matrix(rbind(c(1-a,a), c(b, 1-b)),
                              n*2, n*2, TRUE, NULL, FALSE, FALSE)),
   replications = 100000,
   order = "relative")

#      test replications elapsed relative user.self sys.self user.child sys.child
# 3 method2       100000    1.00     1.00      0.99        0         NA        NA
# 2 method1       100000    1.13     1.13      1.12        0         NA        NA
# 1 method0       100000    1.46     1.46      1.46        0         NA        NA
share|improve this answer
    
Note that you can't use .Internal in packages hosted on CRAN. See the CRAN Repository Policy. –  Joshua Ulrich Nov 12 '12 at 22:13
    
That's in part why I said I would not recommend it. My biggest concern would be that the R developers are free to make changes to these internals, and it could cause this code to break in the future. –  flodel Nov 12 '12 at 22:15
    
Yes, I figured that was the reason. I just wanted to be explicit. ;) –  Joshua Ulrich Nov 12 '12 at 22:35
    
I get some extra speeding by compiling the function using compiler::cmpfun(). Not as much as using .Internal, but better. –  Noam Ross Nov 12 '12 at 22:48
add comment

I get a small speedup with the following:

f = function(a, b, n){
  z = rbind(
    c(rbind(1 - a, b)),
    c(rbind(a, 1 - b))
  )

  do.call(rbind, lapply(1:n, function(i) z))
}

I'll keep looking.

Edit I'm stumped. If this isn't good enough, I'd recommend inlining some rcpp.

share|improve this answer
    
On my machine, this is almost twice as slow as the OP's version. –  flodel Nov 12 '12 at 22:01
    
Weird. On my machine, system.time(replicate(100000, f(a, b, n))) takes 2 seconds and system.time(replicate(100000, g(a, b, n))) takes 3.5, where g is what Noam wrote. –  David J. Harris Nov 12 '12 at 22:06
    
Yours takes less than a second, though. Nice optimization. –  David J. Harris Nov 12 '12 at 22:18
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