scan.test | R Documentation |
Performs the Spatial Scan Test for clustering in a spatial point pattern, or for clustering of one type of point in a bivariate spatial point pattern.
scan.test(X, r, ..., method = c("poisson", "binomial"), nsim = 19, baseline = NULL, case = 2, alternative = c("greater", "less", "two.sided"), verbose = TRUE)
X |
A point pattern (object of class |
r |
Radius of circle to use. A single number or a numeric vector. |
... |
Optional. Arguments passed to |
method |
Either |
nsim |
Number of simulations for computing Monte Carlo p-value. |
baseline |
Baseline for the Poisson intensity, if |
case |
Which type of point should be interpreted as a case,
if |
alternative |
Alternative hypothesis: |
verbose |
Logical. Whether to print progress reports. |
The spatial scan test (Kulldorf, 1997) is applied
to the point pattern X
.
In a nutshell,
If method="poisson"
then
a significant result would mean that there is a circle of radius
r
, located somewhere in the spatial domain of the data,
which contains a significantly higher than
expected number of points of X
. That is, the
pattern X
exhibits spatial clustering.
If method="binomial"
then X
must be a bivariate (two-type)
point pattern. By default, the first type of point is interpreted as
a control (non-event) and the second type of point as a case (event).
A significant result would mean that there is a
circle of radius r
which contains a significantly higher than
expected number of cases. That is, the cases are clustered together,
conditional on the locations of all points.
Following is a more detailed explanation.
If method="poisson"
then the scan test based on Poisson
likelihood is performed (Kulldorf, 1997).
The dataset X
is treated as an unmarked point pattern.
By default (if baseline
is not specified)
the null hypothesis is complete spatial randomness CSR
(i.e. a uniform Poisson process).
The alternative hypothesis is a Poisson process with
one intensity beta1 inside some circle of radius
r
and another intensity beta0 outside the
circle.
If baseline
is given, then it should be a pixel image
or a function(x,y)
. The null hypothesis is
an inhomogeneous Poisson process with intensity proportional
to baseline
. The alternative hypothesis is an inhomogeneous
Poisson process with intensity
beta1 * baseline
inside some circle of radius r
,
and beta0 * baseline
outside the circle.
If method="binomial"
then the scan test based on
binomial likelihood is performed (Kulldorf, 1997).
The dataset X
must be a bivariate point pattern,
i.e. a multitype point pattern with two types.
The null hypothesis is that all permutations of the type labels are
equally likely.
The alternative hypothesis is that some circle of radius
r
has a higher proportion of points of the second type,
than expected under the null hypothesis.
The result of scan.test
is a hypothesis test
(object of class "htest"
) which can be plotted to
report the results. The component p.value
contains the
p-value.
The result of scan.test
can also be plotted (using the plot
method for the class "scan.test"
). The plot is
a pixel image of the Likelihood Ratio Test Statistic
(2 times the log likelihood ratio) as a function
of the location of the centre of the circle.
This pixel image can be extracted from the object
using as.im.scan.test
.
The Likelihood Ratio Test Statistic is computed by
scanLRTS
.
An object of class "htest"
(hypothesis test)
which also belongs to the class "scan.test"
.
Printing this object gives the result of the test.
Plotting this object displays the Likelihood Ratio Test Statistic
as a function of the location of the centre of the circle.
and \rolf
Kulldorff, M. (1997) A spatial scan statistic. Communications in Statistics — Theory and Methods 26, 1481–1496.
plot.scan.test
,
as.im.scan.test
,
relrisk
,
scanLRTS
nsim <- if(interactive()) 19 else 2 rr <- if(interactive()) seq(0.5, 1, by=0.1) else c(0.5, 1) scan.test(redwood, 0.1 * rr, method="poisson", nsim=nsim) scan.test(chorley, rr, method="binomial", case="larynx", nsim=nsim)
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