Perform morphological opening of a window, a line segment pattern or a point pattern.
opening(w, r, ...) # S3 method for owin
opening(w, r, ..., polygonal=NULL)
# S3 method for ppp
opening(w, r, ...)
# S3 method for psp
opening(w, r, ...)
If r > 0
, an object of class "owin"
representing the
opened region. If r=0
, the result is identical to w
.
A window (object of class "owin"
or a line segment pattern (object of class "psp"
)
or a point pattern (object of class "ppp"
).
positive number: the radius of the opening.
extra arguments passed to as.mask
controlling the pixel resolution, if a pixel approximation is used
Logical flag indicating whether to compute a polygonal
approximation to the erosion (polygonal=TRUE
) or
a pixel grid approximation (polygonal=FALSE
).
Adrian Baddeley Adrian.Baddeley@curtin.edu.au
and Rolf Turner r.turner@auckland.ac.nz
The morphological opening (Serra, 1982)
of a set \(W\) by a distance \(r > 0\)
is the subset of points in \(W\) that can be
separated from the boundary of \(W\) by a circle of radius \(r\).
That is, a point \(x\) belongs to the opening
if it is possible to draw a circle of radius \(r\) (not necessarily
centred on \(x\)) that has \(x\) on the inside
and the boundary of \(W\) on the outside.
The opened set is a subset of W
.
For a small radius \(r\), the opening operation has the effect of smoothing out irregularities in the boundary of \(W\). For larger radii, the opening operation removes promontories in the boundary. For very large radii, the opened set is empty.
The algorithm applies erosion
followed by
dilation
.
Serra, J. (1982) Image analysis and mathematical morphology. Academic Press.
closing
for the opposite operation.
dilation
, erosion
for the basic
operations.
owin
,
as.owin
for information about windows.
v <- opening(letterR, 0.3)
plot(letterR, type="n", main="opening")
plot(v, add=TRUE, col="grey")
plot(letterR, add=TRUE)
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