# Identify a linear feature on a raster map and return a linear shape object using R

I would like to identify linear features, such as roads and rivers, on raster maps and convert them to a linear spatial object (`SpatialLines` class) using R.

The `raster` and `sp` packages can be used to convert features from rasters to polygon vector objects (`SpatialPolygons` class). `rasterToPolygons()` will extract cells of a certain value from a raster and return a polygon object. The product can be simplified using the `dissolve=TRUE` option, which calls routines in the `rgeos` package to do this.

This all works just fine, but I would prefer it to be a `SpatialLines` object. How can I do this?

Consider this example:

``````## Produce a sinuous linear feature on a raster as an example
library(raster)
r <- raster(nrow=400, ncol=400, xmn=0, ymn=0, xmx=400, ymx=400)
r[] <- NA
x <-seq(1, 100, by=0.01)
r[cellFromRowCol(r, round((sin(0.2*x) + cos(0.06*x)+2)*100), round(x*4))] <- 1

## Quick trick to make it three cells wide
r[edge(r, type="outer")] <- 1

## Plot
plot(r, legend=FALSE, axes=FALSE)
``````

``````## Convert linear feature to a SpatialPolygons object
library(rgeos)
rPoly <- rasterToPolygons(r, fun=function(x) x==1, dissolve=TRUE)
plot(rPoly)
``````

Would the best approach be to find a centre line through the polygon?
Or is there existing code available to do this?

EDIT: Thanks to @mdsumner for pointing out that this is called skeletonization.

-

Here's my effort. The plan is:

• densify the lines
• compute a delaunay triangulation
• take the midpoints, and take those points that are in the polygon
• build a distance-weighted minimum spanning tree
• find its graph diameter path

The densifying code for starters:

``````densify <- function(xy,n=5){
## densify a 2-col matrix
cbind(dens(xy[,1],n=n),dens(xy[,2],n=n))
}

dens <- function(x,n=5){
## densify a vector
out = rep(NA,1+(length(x)-1)*(n+1))
ss = seq(1,length(out),by=(n+1))
out[ss]=x
for(s in 1:(length(x)-1)){
out[(1+ss[s]):(ss[s+1]-1)]=seq(x[s],x[s+1],len=(n+2))[-c(1,n+2)]
}
out
}
``````

And now the main course:

``````simplecentre <- function(xyP,dense){
require(deldir)
require(splancs)
require(igraph)
require(rgeos)

if(!missing(dense)){
xy = densify(xyP,dense)
} else {
xy = xyP
}

### compute triangulation
d=deldir(xy[,1],xy[,2])

### find midpoints of triangle sides
mids=cbind((d\$delsgs[,'x1']+d\$delsgs[,'x2'])/2,
(d\$delsgs[,'y1']+d\$delsgs[,'y2'])/2)

### get points that are inside the polygon
sr = SpatialPolygons(list(Polygons(list(Polygon(xyP)),ID=1)))
ins = over(SpatialPoints(mids),sr)

### select the points
pts = mids[!is.na(ins),]

dPoly = gDistance(as(sr,"SpatialLines"),SpatialPoints(pts),byid=TRUE)
pts = pts[dPoly > max(dPoly/1.5),]

### now build a minimum spanning tree weighted on the distance
T = minimum.spanning.tree(G,weighted=TRUE)

### get a diameter
path = get.diameter(T)

if(length(path)!=vcount(T)){
stop("Path not linear - try increasing dens parameter")
}

### path should be the sequence of points in order
list(pts=pts[path+1,],tree=T)

}
``````

Instead of the buffering of the earlier version I compute the distance from each midpoint to the line of the polygon, and only take points that are a) inside, and b) further from the edge than 1.5 of the distance of the inside point that is furthest from the edge.

Problems can arise if the polygon kinks back on itself, with long segments, and no densification. In this case the graph is a tree and the code reports it.

As a test, I digitized a line (s, SpatialLines object), buffered it (p), then computed the centreline and superimposed them:

`````` s = capture()
p = gBuffer(s,width=0.2)
plot(p,col="#cdeaff")
scp = simplecentre(onering(p))
lines(scp\$pts,col="white")
``````

The 'onering' function just gets the coordinates of one ring from a SpatialPolygons thing that should only be one ring:

``````onering=function(p){p@polygons[[1]]@Polygons[[1]]@coords}
``````

Capture spatial lines features with the 'capture' function:

``````capture = function(){p=locator(type="l")
SpatialLines(list(Lines(list(Line(cbind(p\$x,p\$y))),ID=1)))}
``````
-
Nice work! I ran this on a coordinate system with a much coarser resolution, and had to up the wb parameter to make it work. But when I did so, it worked beautifully. As you note, increasing wb manually works well to deal with artifacts at the line endponts. – digitalmaps Mar 10 '12 at 3:30
Couple of suggestions: edit to add: `else { xy = xyP }` below the `if (!missing(dense))` block, otherwise it fails when dense is not given. Also edit to remove `if(!missing(wb)){` and force it to run `gBuffer()`. If `wb` was not specified it was not buffering and finding the boundary and not centre-line. Nice one getting this out of the way before the weekend. – digitalmaps Mar 10 '12 at 3:41
A few changes in latest edit, including replacing buffering with distance detection. – Spacedman Mar 10 '12 at 15:18
Getting more and more elegant every time I check back! What happened to your weekend? :) This is great, and quite efficient too. Edit: remove the `dThresh` parameter as it is not used. – digitalmaps Mar 10 '12 at 17:35
You'd think it would be worth more than one upvote by now :( – Spacedman Mar 10 '12 at 18:13

You can get the boundary of that polygon as SpatialLines by direct coercion:

``````rLines <- as(rPoly, "SpatialLinesDataFrame")
``````

Summarizing the coordinates down to a single "centre line" would be possible, but nothing immediate that I know of. I think that process is generally called "skeletonization":

http://en.wikipedia.org/wiki/Topological_skeleton

-
 I didn't know this process was called skeletonization. This is a useful search term, thanks. However, really need that skeleton and not the boundary for features that are of irregular width. – digitalmaps Mar 7 '12 at 3:12 It seems that the ITK library has routines for skeletonization. Does anyone have experience interfacing this with R? en.wikipedia.org/wiki/… – digitalmaps Mar 7 '12 at 3:56 ImageJ has some skeletonization plugins, and there's an R package that talks to ImageJ. – Spacedman Mar 7 '12 at 13:26 I've just got the C code from here: tog.acm.org/resources/GraphicsGems/gemsiv/thin_image.c working called from R on rasters, but it doesn't solve the problem of vectorising the linear features. – Spacedman Mar 7 '12 at 14:03 @Spacedman, checked out this code, thanks. Though have little experience interfacing C code to R. Is the issue that the skeleton may have multiple "bones," and therefore how to break-off the unnecessary ones? – digitalmaps Mar 7 '12 at 21:20

Thanks to @klewis at gis.stackexchange.com for linking to this elegant algorithm for finding the centre line (in response to a related question I asked there).

The process requires finding the coordinates on the edge of a polygon describing the linear feature and performing a Voronoi tessellation of those points. The coordinates of the Voronoi tiles that fall within the polygon of the linear feature fall on the centre line. Turn these points into a line.

Voronoi tessellation is done really efficiently in R using the `deldir` package, and intersections of polygons and points with the `rgeos` package.

``````## Find points on boundary of rPoly (see question)
rPolyPts <-  coordinates(as(as(rPoly, "SpatialLinesDataFrame"),
"SpatialPointsDataFrame"))

## Perform Voronoi tessellation of those points and extract coordinates of tiles
library(deldir)
rVoronoi <- tile.list(deldir(rPolyPts[, 1], rPolyPts[,2]))
rVoronoiPts <- SpatialPoints(do.call(rbind,
lapply(rVoronoi, function(x) cbind(x\$x, x\$y))))

## Find the points on the Voronoi tiles that fall inside
## the linear feature polygon
## N.B. That the width parameter may need to be adjusted if coordinate
## system is fractional (i.e. if longlat), but must be negative, and less
## than the dimension of a cell on the original raster.
library(rgeos)
rLinePts <- gIntersection(gBuffer(rPoly, width=-1), rVoronoiPts)

## Create SpatialLines object
rLine <- SpatialLines(list(Lines(Line(rLinePts), ID="1")))
``````

The resulting SpatialLines object:

-
 I've been experimenting with solutions that use voronoi tiles, and got something that gave me a nice set of points defining the centreline. However, the problem is then to get the points in the right order, since the segments of the tiling are essentially in a random order. What looked like a proper solution actually had the line jumping back and forth a bit because the voronoi tiles were close, but not exactly, in the right order. – Spacedman Mar 9 '12 at 8:06 Quick test seems to confirm - the deldir code orders the vertices in increasing X coord. So if your object curves back on itself, the line points will jump around like mad. You might be able to reconstruct the lines from some of the other info returned by deldir, or it might be easier to rebuild the line from scratch using a graph algorithm. – Spacedman Mar 9 '12 at 8:42 @Spacedman, as I was writing some generic code to do this I realized quickly that this curve appeared to work so well because it is a near-continuous function (most linear features will not be so). However, this is an excellent point. How about finding the shortest path through the centre-line points using `shortest.paths()` from `igraph`, or possibly `shortestPath()` from `gdistance`. The challenge then would be identifying the endpoints of the linear feature. – digitalmaps Mar 9 '12 at 14:05 I've "un"accepted my own answer. As I think it is possible, now, to do better. – digitalmaps Mar 9 '12 at 14:11 Most of my attempts at this have always produced a few stray points that are hard to get rid of. The GIS packages that do this have some pretty hardcore geometry tidying code. I'll probably waste my weekend on this problem now :) – Spacedman Mar 9 '12 at 16:08