# Shapley Shubik power index from large samples in R

``````library(Deducer)
n.players <- 17
weight <- c(84,92,22,12,12,15,11,22,16,1,12,15,26,20,9,29,4)
quota <- sum(weight)/2+1
p <-n.players
n.cases <-factorial(p)
tab <- perm(1:p)
critical <- rep(0,n.cases)
for (i in 1:n.cases){
weight.sum <- cumsum(weight[tab[i,]])
critical[i] <- tab[i,which.max(weight.sum >= quota)]
}
table(critical)
power <- table(critical)/n.cases
round(power,3)
``````
• this code needs "Deducer" package. Please type the message "install.packages("Deducer")" before you input the code.

In this case, I get an error message because the code is based on large samples. I want to solve the problem in two ways as follows :

1. calculate a kind of cases as many as my personal computer allows (I bought my PC 5 years ago. It is not high performing in those days)and I check the processing time (It is easy. I just use the procedure "proc.time")

2. By using MonteCarlo, I want to approximate the index, and I also check the processing time in this case.

Furthermore, I would want to compare the indices and processing times from between the way1 and way2.

How can I solve this? (I cannot find the package which enlarge the limitation of memory for calculating. Even if I know the elementary level of montecarlo theoritically, I can not apply the mechanism to R code)

-

You can use `sample` to generate random permutations, instead of enumerating all 17! of them.

``````n.cases <- 1e6
critical <- rep(0,n.cases)
for (i in 1:n.cases){
random_permutation <- sample( 1:n.players )
weight.sum <- cumsum( weight[ random_permutation ] )
critical[i] <- random_permutation[ which.max(weight.sum >= quota) ]
}
table(critical)
power <- table(critical) / n.cases
round(power, 3)
``````
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When I need a real value of shapley shubik index, how can I enlarge memory for calculation in R? in this case I had better use "apply" instead of "for loop". –  Choijaeyoung Mar 29 '13 at 14:34
visit "cut-the-knot.org/Curriculum/SocialScience/…;. In this site calculate real value of index for a second. Even though I used "Monte Carlo" for the index, I spent more time than using the former site. I am very sorry to disturbing you –  Choijaeyoung Mar 29 '13 at 14:36
How can I transform your code by using "apply" for more fast calculation? –  Choijaeyoung Mar 29 '13 at 16:42
`Rprof` reveals that most of the time is spent in the `sample` function: removing the loop would not make the code significantly faster. Instead, you can try to reduce the number of samples, say from 1,000,000 to 100,000 (but the third digit will not always be correct). –  Vincent Zoonekynd Mar 29 '13 at 17:47
Thank you a lot. From what you say, for faster calculation, I had better find the packages which allow R to use more memory than depend on "Montecarlo" right? In this case, taking all cases is much more faster than "sampling" because random number generating time is relatively taking a long time. –  Choijaeyoung Mar 29 '13 at 19:39