# R: optimal way of computing the “product” of two vectors

Let's assume that I have a vector

``````r <- rnorm(4)
``````

and a matrix `W` of dimension 20000*200 for example:

``````W <- matrix(rnorm(20000*200),20000,200)
``````

I want to compute a new matrix `M` of dimension 5000*200 such that `m11 <- r%*%W[1:4,1]`, `m21 <- r%*%W[5:8,1]`, `m12 <- r%*%W[1:4,2]` etc. (i.e. grouping rows 4-by-4 and computing the product).

What's the optimal (speed,memory) way of doing this?

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This seems to run fastest for me:

``````array(r %*% array(W, c(4, 20000 * 200 / 4)), c(5000, 200))
``````
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Respect :) Fastest indeed. –  Marek Jun 14 '10 at 16:14
And uses less memory as I checked –  Marek Jun 14 '10 at 16:21
Works great!thx –  teucer Jun 15 '10 at 7:44

First on my mind is `apply` over shorter dim:

``````M <- apply(W, 2, function(x) r%*%matrix(x,4,5000))

m11 <- r%*%W[1:4,1]
m21 <- r%*%W[5:8,1]
m12 <- r%*%W[1:4,2]

m11 - M[1,1]
#      [,1]
# [1,]    0
m21 - M[2,1]
#      [,1]
# [1,]    0
m12 - M[1,2]

#      [,1]
# [1,]    0
``````

``````M <- apply(array(W,c(4,5000,200)), 3, function(x) r%*%x)
``````

to iterated over shorter dim (again).

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you solution is much faster than my solution. great! –  kohske Jun 14 '10 at 14:10

I don't know if this is optimal in speed or memory, but probably one of the simple way:

``````m<-apply(array(W,c(4,5000,200)),c(2,3),"%*%",r)

> m[1,1:10]==r%*%W[1:4,1:10]
[,1] [,2] [,3] [,4] [,5] [,6] [,7] [,8] [,9] [,10]
[1,] TRUE TRUE TRUE TRUE TRUE TRUE TRUE TRUE TRUE  TRUE
> m[2,1:10]==r%*%W[5:8,1:10]
[,1] [,2] [,3] [,4] [,5] [,6] [,7] [,8] [,9] [,10]
[1,] TRUE TRUE TRUE TRUE TRUE TRUE TRUE TRUE TRUE  TRUE
``````
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