# Multiply rows of matrix by vector?

I'm optimizing a function and I want to get rid of slow for loops. I'm looking for a faster way to multiply each row of a matrix by a vector.

Any ideas?

EDIT:

I'm not looking for a 'classical' multiplication.

Eg. I have matrix that has 23 columns and 25 rows and a vector that has length of 23. In a result I want to have matrix 25x23 that has each row multiplied by vector.

-

I think you're looking for `sweep()`.

``````> (mat <- matrix(rep(1:3,each=5),nrow=3,ncol=5,byrow=TRUE))
[,1] [,2] [,3] [,4] [,5]
[1,]    1    1    1    1    1
[2,]    2    2    2    2    2
[3,]    3    3    3    3    3
> vec <- 1:5
> sweep(mat,MARGIN=2,vec,`*`)
[,1] [,2] [,3] [,4] [,5]
[1,]    1    2    3    4    5
[2,]    2    4    6    8   10
[3,]    3    6    9   12   15
``````

It's been one of R's core functions, though improvements have been made on it over the years.

-
``````> MyMatrix <- matrix(c(1,2,3, 11,12,13), nrow = 2, ncol=3, byrow=TRUE)
> MyMatrix
[,1] [,2] [,3]
[1,]    1    2    3
[2,]   11   12   13
> MyVector <- c(1:3)
> MyVector
[1] 1 2 3
``````

You could use either:

``````> t(t(MyMatrix) * MyVector)
[,1] [,2] [,3]
[1,]    1    4    9
[2,]   11   24   39
``````

or:

``````> MyMatrix %*% diag(MyVector)
[,1] [,2] [,3]
[1,]    1    4    9
[2,]   11   24   39
``````
-

Actually, `sweep` is not the fastest option on my computer:

``````MyMatrix <- matrix(c(1:1e6), ncol=1e4, byrow=TRUE)
MyVector <- c(1:1e4)

Rprof(tmp <- tempfile(),interval = 0.001)
t(t(MyMatrix) * MyVector) # first option
Rprof()
MyTimerTranspose=summaryRprof(tmp)\$sampling.time

Rprof(tmp <- tempfile(),interval = 0.001)
MyMatrix %*% diag(MyVector) # second option
Rprof()
MyTimerDiag=summaryRprof(tmp)\$sampling.time

Rprof(tmp <- tempfile(),interval = 0.001)
sweep(MyMatrix ,MARGIN=2,MyVector,`*`)  # third option
Rprof()
MyTimerSweep=summaryRprof(tmp)\$sampling.time

Rprof(tmp <- tempfile(),interval = 0.001)
t(t(MyMatrix) * MyVector) # first option again, to check order
Rprof()
MyTimerTransposeAgain=summaryRprof(tmp)\$sampling.time

MyTimerTranspose
MyTimerDiag
MyTimerSweep
MyTimerTransposeAgain
``````

This yields:

``````> MyTimerTranspose
[1] 0.04
> MyTimerDiag
[1] 40.722
> MyTimerSweep
[1] 33.774
> MyTimerTransposeAgain
[1] 0.043
``````

On top of being the slowest option, the second option reaches the memory limit (2046 MB). However, considering the remaining options, the double transposition seems a lot better than `sweep` in my opinion.

Edit

Just trying smaller data a repeated number of times:

``````MyMatrix <- matrix(c(1:1e3), ncol=1e1, byrow=TRUE)
MyVector <- c(1:1e1)
n=100000

[...]

for(i in 1:n){
}

[...]

> MyTimerTranspose
[1] 5.383
> MyTimerDiag
[1] 6.404
> MyTimerSweep
[1] 12.843
> MyTimerTransposeAgain
[1] 5.428
``````
-
In my experience, if you throw a bunch of `NA`s into the matrix, the time taken by `diag` seems to go through the roof. For a 1E4x1E4 mat containing 1E5 `NA`s, I obtain: `MyTimerTranspose`=0.014, `MyTimerSweep`=0.042, `MyTimerDiag`=67.738. I'd replicate, but I'm impatient... just something to keep in mind. –  jbaums Mar 1 '12 at 22:19
I really like the double transposition answer, mainly because it shows what the answer is if we replace "row" with "column", making the answer the trivial A*x, which isn't obvious unless you truly understand how R works with matrices. –  MHH Dec 23 '13 at 3:38