# closepairs

##### Close Pairs of Points

Low-level functions to find all close pairs of points.

##### Usage

`closepaircounts(X, r)`crosspaircounts(X, Y, r)

closepairs(X, rmax, …)

# S3 method for ppp
closepairs(X, rmax, twice=TRUE,
what=c("all","indices","ijd"),
distinct=TRUE, neat=TRUE,
periodic=FALSE, …)

crosspairs(X, Y, rmax, …)

# S3 method for ppp
crosspairs(X, Y, rmax, what=c("all", "indices", "ijd"), …)

##### Arguments

- X,Y
Point patterns (objects of class

`"ppp"`

).- r,rmax
Maximum distance between pairs of points to be counted as close pairs.

- twice
Logical value indicating whether all ordered pairs of close points should be returned. If

`twice=TRUE`

(the default), each pair will appear twice in the output, as`(i,j)`

and again as`(j,i)`

. If`twice=FALSE`

, then each pair will appear only once, as the pair`(i,j)`

with`i < j`

.- what
String specifying the data to be returned for each close pair of points. If

`what="all"`

(the default) then the returned information includes the indices`i,j`

of each pair, their`x,y`

coordinates, and the distance between them. If`what="indices"`

then only the indices`i,j`

are returned. If`what="ijd"`

then the indices`i,j`

and the distance`d`

are returned.- distinct
Logical value indicating whether to return only the pairs of points with different indices

`i`

and`j`

(`distinct=TRUE`

, the default) or to also include the pairs where`i=j`

(`distinct=FALSE`

).- neat
Logical value indicating whether to ensure that

`i < j`

in each output pair, when`twice=FALSE`

.- periodic
Logical value indicating whether to use the periodic edge correction. The window of

`X`

should be a rectangle. Opposite pairs of edges of the window will be treated as identical.- …
Extra arguments, ignored by methods.

##### Details

These are the efficient low-level functions used by spatstat to find all close pairs of points in a point pattern or all close pairs between two point patterns.

`closepaircounts(X,r)`

counts the number of neighbours for
each point in the pattern `X`

. That is, for each point
`X[i]`

, it counts the number of other points `X[j]`

with `j != i`

such that `d(X[i],X[j]) <= r`

where
`d`

denotes Euclidean distance. The result is an integer vector
`v`

such that `v[i]`

is the number of neighbours of
`X[i]`

.

`crosspaircounts(X,Y,r)`

counts, for each point
in the pattern `X`

, the number of neighbours in the pattern
`Y`

. That is, for each point
`X[i]`

, it counts the number of points `Y[j]`

such that `d(X[i],X[j]) <= r`

. The result is an integer vector
`v`

such that `v[i]`

is the number of neighbours of
`X[i]`

in the pattern `Y`

.

`closepairs(X,rmax)`

identifies all pairs of distinct neighbours
in the pattern `X`

and returns them. The result is
a list with the following components:

- i
Integer vector of indices of the first point in each pair.

- j
Integer vector of indices of the second point in each pair.

- xi,yi
Coordinates of the first point in each pair.

- xj,yj
Coordinates of the second point in each pair.

- dx
Equal to

`xj-xi`

- dy
Equal to

`yj-yi`

- d
Euclidean distance between each pair of points.

If `what="indices"`

then only the components `i`

and
`j`

are returned. This is slightly faster and more efficient
with use of memory.

`crosspairs(X,rmax)`

identifies all pairs of neighbours
`(X[i], Y[j])`

between the patterns `X`

and `Y`

,
and returns them. The result is
a list with the same format as for `closepairs`

.

##### Value

For `closepaircounts`

and `crosspaircounts`

, an integer
vector of length equal to the number of points in `X`

.

For `closepairs`

and `crosspairs`

,
a list with components `i`

and `j`

,
and possibly other components as described under Details.

##### Warning about accuracy

The results of these functions may not agree exactly with
the correct answer (as calculated by a human) and may not
be consistent between different computers and different installations
of R. The discrepancies arise in marginal cases where the interpoint
distance is equal to, or very close to, the threshold `rmax`

.

Floating-point numbers in a computer
are not mathematical Real Numbers: they are approximations using
finite-precision binary arithmetic.
The approximation is accurate to a tolerance of about
`.Machine$double.eps`

.

If the true interpoint distance \(d\) and the threshold `rmax`

are equal, or if their difference is no more than `.Machine$double.eps`

,
the result may be incorrect.

##### See Also

`closepairs.pp3`

for the corresponding
functions for 3D point patterns.

`Kest`

, `Kcross`

,
`nndist`

, `nncross`

,
`applynbd`

, `markstat`

for functions which use these capabilities.

##### Examples

```
# NOT RUN {
a <- closepaircounts(cells, 0.1)
sum(a)
Y <- split(amacrine)
b <- crosspaircounts(Y$on, Y$off, 0.1)
d <- closepairs(cells, 0.1)
e <- crosspairs(Y$on, Y$off, 0.1)
# }
```

*Documentation reproduced from package spatstat, version 1.56-1, License: GPL (>= 2)*