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I was wondering if there was a function that scales down matrices in R statistical software exactly like with image resizing. The function imresize() in MATLAB is exactly what I'm looking for (I believe it takes the average of the surrounding points, but I am not sure of this), but I am wondering if there is an R equivalent for this function.

This question has been posted before on this forum, but with reference to MATLAB, not R: Matlab "Scale Down" a Vector with Averages The post starting with "Any reason why you can't use the imresize() function?" is exactly what I am looking for, but in R, not MATLAB.

Say I have a latitude-longitude grid of temperatures around the world, and let's say this is represented by a 64*128 matrix of temperatures. Now let's say I would like to have the same data contained in a new matrix, but I would like to rescale my grid to make it a 71*114 matrix of temperatures around the world. A function that would allow me to do so is what I'm looking for (again, the imresize() function, but in R, not MATLAB)

Thank you. Steve

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This question looks identical to stackoverflow.com/q/10865489/602276 –  Andrie Jun 20 '12 at 16:54
    
Several R image-manipulation packages have a "resize" -- like function, often to scale up or down. It's also not hard to roll your own, depending on how you want to collapse the values -- average, or spline, etc. So: what do you want: mean temperatures in your grid, or worst-case (e.g. max) temperatures, etc? –  Carl Witthoft Jun 20 '12 at 18:34
    
@CarlWitthoft Do you have some particular package::function's in mind? I for one would be happy for any pointers you can provide. Thanks. –  Josh O'Brien Jun 20 '12 at 19:37
    
@JoshO'Brien I was probably thinking of aggregate, also in the raster package. (as is disaggregate). I wrote a complex version of these tools to handle E-M wavefront propagation if anyone's interested. –  Carl Witthoft Jun 20 '12 at 21:34
    
It occurs to me, far too late, :-( that this problem may best be handled in the general case with a kernel-based convolution approach. –  Carl Witthoft Jun 21 '12 at 1:12

2 Answers 2

up vote 8 down vote accepted

One way to do this is by using the function resample(), from the raster package.

I'll first show how you could use it to rescale your grid, and then give an easier-to-inspect example of its application to smaller raster objects

Use resample() to resize matrices

library(raster)
m <- matrix(seq_len(68*128), nrow=68, ncol=128, byrow=TRUE)

## Convert matrix to a raster with geographical coordinates
r <- raster(m)
extent(r) <- extent(c(-180, 180, -90, 90))

## Create a raster with the desired dimensions, and resample into it
s <- raster(nrow=71, ncol=114)
s <- resample(r,s)

## Convert resampled raster back to a matrix
m2 <- as.matrix(s)

Visually confirm that resample() does what you'd like:

library(raster)
## Original data (4x4)
rr <- raster(ncol=4, nrow=4)
rr[] <- 1:16
## Resize to 5x5
ss <- raster(ncol=5,  nrow=5)
ss <- resample(rr, ss)
## Resize to 3x3
tt <- raster(ncol=3, nrow=3)
tt <- resample(rr, tt)
## Plot for comparison
par(mfcol=c(2,2))
plot(rr, main="original data")
plot(ss, main="resampled to 5-by-5")
plot(tt, main="resampled to 3-by-3")

enter image description here

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The answer posted by Josh O'Brien is OK and it helped me (for starting point), but this approach was to slowly since I had huge list of data. The method below is good alternative. It uses fields and works much faster.

Functions

rescale <- function(x, newrange=range(x)){
  xrange <- range(x)
  mfac <- (newrange[2]-newrange[1])/(xrange[2]-xrange[1])
  newrange[1]+(x-xrange[1])*mfac
}

ResizeMat <- function(mat, ndim=dim(mat)){
  if(!require(fields)) stop("`fields` required.")

  # input object
  odim <- dim(mat)
  obj <- list(x= 1:odim[1], y=1:odim[2], z= mat)

  # output object
  ans <- matrix(NA, nrow=ndim[1], ncol=ndim[2])
  ndim <- dim(ans)

  # rescaling
  ncord <- as.matrix(expand.grid(seq_len(ndim[1]), seq_len(ndim[2])))
  loc <- ncord
  loc[,1] = rescale(ncord[,1], c(1,odim[1]))
  loc[,2] = rescale(ncord[,2], c(1,odim[2]))

  # interpolation
  ans[ncord] <- interp.surface(obj, loc)

  ans
}

Lets look how it works

## Original data (4x4)
rr <- matrix(1:16, ncol=4, nrow=4)
ss <- ResizeMat(rr, c(5,5)) 
tt <- ResizeMat(rr, c(3,3)) 

## Plot for comparison
par(mfcol=c(2,2), mar=c(1,1,2,1))
image(rr, main="original data", axes=FALSE)
image(ss, main="resampled to 5-by-5", axes=FALSE)
image(tt, main="resampled to 3-by-3", axes=FALSE)

Resized matrix

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