harmonic: Basis for Harmonic Functions
In spatstat.model: Parametric Statistical Modelling and Inference for the 'spatstat' Family
harmonic R Documentation
Basis for Harmonic Functions
Description
Evaluates a basis for the harmonic polynomials in x and y
of degree less than or equal to n.
Usage
harmonic(x, y, n)
Arguments
x
Vector of x coordinates
y
Vector of y coordinates
n
Maximum degree of polynomial
Details
This function computes a basis for the harmonic polynomials
in two variables x and y up to a given degree n
and evaluates them at given x,y locations.
It can be used in model formulas (for example in
the model-fitting functions
lm,glm,gam and
ppm) to specify a
linear predictor which is a harmonic function.
A function f(x,y) is harmonic if
\frac{\partial^2}{\partial x^2} f
+ \frac{\partial^2}{\partial y^2}f = 0.
The harmonic polynomials of degree less than or equal to
n have a basis consisting of 2 n functions.
This function was implemented on a suggestion of P. McCullagh
for fitting nonstationary spatial trend to point process models.
Value
A data frame with 2 * n columns giving the values of the
basis functions at the coordinates. Each column is labelled by an
algebraic expression for the corresponding basis function.
Author(s)
\spatstatAuthors.
See Also
ppm,
polynom
Examples
# inhomogeneous point pattern
X <- unmark(longleaf)
# fit Poisson point process with log-cubic intensity
fit.3 <- ppm(X ~ polynom(x,y,3), Poisson())
# fit Poisson process with log-cubic-harmonic intensity
fit.h <- ppm(X ~ harmonic(x,y,3), Poisson())
# Likelihood ratio test
lrts <- 2 * (logLik(fit.3) - logLik(fit.h))
df <- with(coords(X),
ncol(polynom(x,y,3)) - ncol(harmonic(x,y,3)))
pval <- 1 - pchisq(lrts, df=df)
spatstat.model documentation built on Sept. 30, 2024, 9:26 a.m.
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| harmonic | R Documentation |
Basis for Harmonic Functions
Description
Evaluates a basis for the harmonic polynomials in x and y
of degree less than or equal to n.
Usage
harmonic(x, y, n)
Arguments
x |
Vector of |
y |
Vector of |
n |
Maximum degree of polynomial |
Details
This function computes a basis for the harmonic polynomials
in two variables x and y up to a given degree n
and evaluates them at given x,y locations.
It can be used in model formulas (for example in
the model-fitting functions
lm,glm,gam and
ppm) to specify a
linear predictor which is a harmonic function.
A function f(x,y) is harmonic if
\frac{\partial^2}{\partial x^2} f
+ \frac{\partial^2}{\partial y^2}f = 0.
The harmonic polynomials of degree less than or equal to
n have a basis consisting of 2 n functions.
This function was implemented on a suggestion of P. McCullagh for fitting nonstationary spatial trend to point process models.
Value
A data frame with 2 * n columns giving the values of the
basis functions at the coordinates. Each column is labelled by an
algebraic expression for the corresponding basis function.
Author(s)
\spatstatAuthors.
See Also
ppm,
polynom
Examples
# inhomogeneous point pattern
X <- unmark(longleaf)
# fit Poisson point process with log-cubic intensity
fit.3 <- ppm(X ~ polynom(x,y,3), Poisson())
# fit Poisson process with log-cubic-harmonic intensity
fit.h <- ppm(X ~ harmonic(x,y,3), Poisson())
# Likelihood ratio test
lrts <- 2 * (logLik(fit.3) - logLik(fit.h))
df <- with(coords(X),
ncol(polynom(x,y,3)) - ncol(harmonic(x,y,3)))
pval <- 1 - pchisq(lrts, df=df)
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We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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