问题
Starting from a shapefile containing a fairly large number (about 20000) of potentially partially-overlapping polygons, I'd need to extract all the sub-polygons originated by intersecting their different "boundaries".
In practice, starting from some mock-up data:
library(tibble)
library(dplyr)
library(sf)
ncircles <- 9
rmax <- 120
x_limits <- c(-70,70)
y_limits <- c(-30,30)
set.seed(100)
xy <- data.frame(
id = paste0("id_", 1:ncircles),
x = runif(ncircles, min(x_limits), max(x_limits)),
y = runif(ncircles, min(y_limits), max(y_limits))) %>%
as_tibble()
polys <- st_as_sf(xy, coords = c(2,3)) %>%
st_buffer(runif(ncircles, min = 1, max = 20))
plot(polys[1])
I'd need to derive an sf
or sp
multipolygon containing ALL and ONLY the polygons generated by the intersections, something like:
(note that the colors are there just to exemplify the expected result, in which each "differently colored" area is a separate polygon which doesn't overlay any other polygon)
I know I could work my way out by analyzing one polygon at a time, identifying and saving all its intersections and then "erase" those areas form the full multipolygon and proceed in a cycle, but that is quite slow.
I feel there should be a more efficient solution for this, but I am not able to figure it out, so any help would be appreciated!
(Both sf
and sp
based solutions are welcome)
UPDATE:
In the end, I found out that even going "one polygon at a time" the task is far from simple! I'm really struggling on this apparently "easy" problem! Any hints? Even a slow solution or hints for starting on a proper path would be appreciated!
UPDATE 2:
Maybe this will clarify things: the desired functionality would be similar to the one described here:
https://it.mathworks.com/matlabcentral/fileexchange/18173-polygon-intersection?requestedDomain=www.mathworks.com
UPDATE 3:
I awarded the bounty to @shuiping-chen (thanks !), whose answer correctly solved the problem on the example dataset provided. The "method" has however to be generalized to situations were "quadruple" or "n-uple" intersections are possible. I'll try to work on that in the coming days and post a more general solution if I manage !
回答1:
This has now been implemented in R package sf as the default result when st_intersection
is called with a single argument (sf or sfc), see https://r-spatial.github.io/sf/reference/geos_binary_ops.html for the examples. (I'm not sure the origins
field contains useful indexes; ideally they should point to indexes in x
only, right now they kind of self-refer).
回答2:
Input
I modify the mock-up data a bit in order to illustrate the ability to deal with multiple attributes.
library(tibble)
library(dplyr)
library(sf)
ncircles <- 9
rmax <- 120
x_limits <- c(-70,70)
y_limits <- c(-30,30)
set.seed(100)
xy <- data.frame(
id = paste0("id_", 1:ncircles),
val = paste0("val_", 1:ncircles),
x = runif(ncircles, min(x_limits), max(x_limits)),
y = runif(ncircles, min(y_limits), max(y_limits)),
stringsAsFactors = FALSE) %>%
as_tibble()
polys <- st_as_sf(xy, coords = c(3,4)) %>%
st_buffer(runif(ncircles, min = 1, max = 20))
plot(polys[1])
Basic Operation
Then define the following two functions.
cur
: the current index of the base polygonx
: the index of polygons, which intersects withcur
input_polys
: the simple feature of the polygonskeep_columns
: the vector of names of attributes needed to keep after the geometric calculation
get_difference_region()
get the difference between the base polygon and other intersected polygons; get_intersection_region()
get the intersections among the intersected polygons.
library(stringr)
get_difference_region <- function(cur, x, input_polys, keep_columns=c("id")){
x <- x[!x==cur] # remove self
len <- length(x)
input_poly_sfc <- st_geometry(input_polys)
input_poly_attr <- as.data.frame(as.data.frame(input_polys)[, keep_columns])
# base poly
res_poly <- input_poly_sfc[[cur]]
res_attr <- input_poly_attr[cur, ]
# substract the intersection parts from base poly
if(len > 0){
for(i in 1:len){
res_poly <- st_difference(res_poly, input_poly_sfc[[x[i]]])
}
}
return(cbind(res_attr, data.frame(geom=st_as_text(res_poly))))
}
get_intersection_region <- function(cur, x, input_polys, keep_columns=c("id"), sep="&"){
x <- x[!x<=cur] # remove self and remove duplicated obj
len <- length(x)
input_poly_sfc <- st_geometry(input_polys)
input_poly_attr <- as.data.frame(as.data.frame(input_polys)[, keep_columns])
res_df <- data.frame()
if(len > 0){
for(i in 1:len){
res_poly <- st_intersection(input_poly_sfc[[cur]], input_poly_sfc[[x[i]]])
res_attr <- list()
for(j in 1:length(keep_columns)){
pred_attr <- str_split(input_poly_attr[cur, j], sep, simplify = TRUE)
next_attr <- str_split(input_poly_attr[x[i], j], sep, simplify = TRUE)
res_attr[[j]] <- paste(sort(unique(c(pred_attr, next_attr))), collapse=sep)
}
res_attr <- as.data.frame(res_attr)
colnames(res_attr) <- keep_columns
res_df <- rbind(res_df, cbind(res_attr, data.frame(geom=st_as_text(res_poly))))
}
}
return(res_df)
}
First Level
Difference
Let's see the difference function effect on the mock-up data.
flag <- st_intersects(polys, polys)
first_diff <- data.frame()
for(i in 1:length(flag)) {
cur_df <- get_difference_region(i, flag[[i]], polys, keep_column = c("id", "val"))
first_diff <- rbind(first_diff, cur_df)
}
first_diff_sf <- st_as_sf(first_diff, wkt="geom")
first_diff_sf
plot(first_diff_sf[1])
Intersection
first_inter <- data.frame()
for(i in 1:length(flag)) {
cur_df <- get_intersection_region(i, flag[[i]], polys, keep_column=c("id", "val"))
first_inter <- rbind(first_inter, cur_df)
}
first_inter <- first_inter[row.names(first_inter %>% select(-geom) %>% distinct()),]
first_inter_sf <- st_as_sf(first_inter, wkt="geom")
first_inter_sf
plot(first_inter_sf[1])
Second Level
use the intersection of first level as input, and repeat the same process.
Difference
flag <- st_intersects(first_inter_sf, first_inter_sf)
# Second level difference region
second_diff <- data.frame()
for(i in 1:length(flag)) {
cur_df <- get_difference_region(i, flag[[i]], first_inter_sf, keep_column = c("id", "val"))
second_diff <- rbind(second_diff, cur_df)
}
second_diff_sf <- st_as_sf(second_diff, wkt="geom")
second_diff_sf
plot(second_diff_sf[1])
Intersection
second_inter <- data.frame()
for(i in 1:length(flag)) {
cur_df <- get_intersection_region(i, flag[[i]], first_inter_sf, keep_column=c("id", "val"))
second_inter <- rbind(second_inter, cur_df)
}
second_inter <- second_inter[row.names(second_inter %>% select(-geom) %>% distinct()),] # remove duplicated shape
second_inter_sf <- st_as_sf(second_inter, wkt="geom")
second_inter_sf
plot(second_inter_sf[1])
Get the distinct intersections of the second level, and use them as the input of the third level. We could get that the intersection results of the third level is NULL
, then the process should end.
Summary
We put all the difference results into close list, and put all the intersection results into open list. Then we have:
- When open list is empty, we stop the process
- The results is close list
Therefore, we get the final code here (the basic two functions should be declared):
# init
close_df <- data.frame()
open_sf <- polys
# main loop
while(!is.null(open_sf)) {
flag <- st_intersects(open_sf, open_sf)
for(i in 1:length(flag)) {
cur_df <- get_difference_region(i, flag[[i]], open_sf, keep_column = c("id", "val"))
close_df <- rbind(close_df, cur_df)
}
cur_open <- data.frame()
for(i in 1:length(flag)) {
cur_df <- get_intersection_region(i, flag[[i]], open_sf, keep_column = c("id", "val"))
cur_open <- rbind(cur_open, cur_df)
}
if(nrow(cur_open) != 0) {
cur_open <- cur_open[row.names(cur_open %>% select(-geom) %>% distinct()),]
open_sf <- st_as_sf(cur_open, wkt="geom")
}
else{
open_sf <- NULL
}
}
close_sf <- st_as_sf(close_df, wkt="geom")
close_sf
plot(close_sf[1])
回答3:
Not sure if it helps you since it is not in R but I think there is a good way to solve this problem using Python. There is a library called GeoPandas (http://geopandas.org/index.html) which has allows you to easily do geo operations. In steps what you would need to do is the following:
- Load all Polygons into geopandas GeoDataFrames
- Loop all GeoDataFrames running a union overlay operation (http://geopandas.org/set_operations.html)
The exact example is shown in the documentation.
Before operation - 2 Polygons
After operation - 9 Polygons
If there is anything unclear feel free to let me know! Hope it helps!
来源:https://stackoverflow.com/questions/44631044/efficient-extraction-of-all-sub-polygons-generated-by-self-intersecting-features