Fits a regression model for a circular dependent and circular independent variable or for a circular dependent and linear independent variables.
lm.circular(..., type=c("c-c", "c-l"))
lm.circular.cc(y, x, order = 1, level = 0.05, control.circular = list())
lm.circular.cl(y, x, init = NULL, verbose = FALSE, tol = 1e-10,
control.circular = list())
# S3 method for lm.circular.cl
print(x, digits = max(3, getOption("digits") - 3),
signif.stars= getOption("show.signif.stars"), ...)arguments passed to lm.circular.cc or to
lm.circular.cl depending on the value of type.
if type=="c-c" then lm.circular.cc is called
otherwise lm.circular.cl is called.
vector of data for the dependent circular variable.
vector of data for the independent circular variable if
type="c-c" or lm.circular.cc is used otherwise a matrix
or a vector containing the independent linear variables.
order of trigonometric polynomial to be fit. Order must be
an integer value. By default, order=1. Used if type="c-c".
level of the test for the significance of higher order
trigonometric terms. Used if type="c-c".
the attribute of the resulting objects (fitted, residuals components in the case of type=="c-c" and mu and se.mu) otherwise.
a vector with initial values of length equal to the columns
of x.
logical: if TRUE messages are printed while the
function is running.
the absolute accuracy to be used to achieve convergence of the algorithm.
the number of digits to be printed.
logical; if TRUE, P-values are additionally encoded
visually as ``significance stars'' in order to help scanning of long
coefficient tables. It defaults to the show.signif.stars slot of options.
If type=="c-c" or lm.circular.cc is called directly an
object of class lm.circular.cc is returned with the following components:
the match.call result.
square root of the average of the squares of the estimated conditional concentration parameters of y given x.
fitted values of the model of class circular.
matrix whose columns correspond to x and y.
circular residuals of the model of class circular.
matrix whose entries are the estimated coefficients of the model. The first column corresponds to the coefficients of the model predicting the cosine of y, while the second column contains the estimates for the model predicting the sine of y. The rows of the matrix correspond to the coefficients according to increasing trigonometric order.
p-values testing whether the (order + 1) trigonometric terms are significantly different from zero.
is mean of the cosines of the circular residuals.
assuming the circular residuals come from a von Mises distribution, kappa is the MLE of the concentration parameter.
If type=="c-l" or lm.circular.cl is called directly an object of class lm.circular.cc is returned with the following components:
the match.call result.
the independent variables.
the dependent variable.
the circular mean of the dependent variable of class circular.
an estimated standard error of the circular mean with the same units of measure used for mu.
the concentration parameter for the dependent variable.
an estimated standard error of the concentration parameter.
the estimated coefficients.
covariance matrix of the estimated coefficients.
standard errord of the estimated coefficients.
log-likehood.
values of the t statistics for the coefficients.
p-values of the t statistics. Approximated values using Normal distribution.
If type=="c-c" or lm.circular.cc is called directly a
trigonometric polynomial of x is fit against the cosine and sine of y.
The order of trigonometric polynomial is specified by order. Fitted
values of y are obtained by taking the inverse tangent of the predicted
values of sin(y) devided by the predicted values of cos(y). Details of
the regression model can be found in Sarma and Jammalamadaka (1993).
If type=="c-l" or lm.circular.cl is called directly,
this function implements the homoscedastic version of the maximum
likelihood regression model proposed by Fisher and Lee (1992). The
model assumes that a circular response variable theta has a von Mises
distribution with concentration parameter kappa, and mean direction
related to a vector of linear predictor variables according to the
relationship: mu + 2*atan(beta'*x), where mu and beta are unknown
parameters, beta being a vector of regression coefficients. The
function uses Green's (1984) iteratively reweighted least squares
algorithm to perform the maximum likelihood estimation of kappa, mu,
and beta. Standard errors of the estimates of kappa, mu, and beta are
estimated via large-sample asymptotic variances using the information
matrix. An estimated circular standard error of the estimate of mu is
then obtained according to Fisher and Lewis (1983, Example 1).
Fisher, N. and Lee, A. (1992). Regression models for an angular response. Biometrics, 48, 665-677.
Fisher, N. and Lewis, T. (1983). Estimating the common mean direction of several circular or spherical distributions with different dispersions. Biometrika, 70, 333-341.
Green, P. (1984). Iteratively reweighted least squares for maximum likelihood estimation, and some robust and resistant alternatives. Journal of the Royal Statistical Society, B, 46, 149-192.
Jammalamadaka, S. Rao and SenGupta, A. (2001). Topics in Circular Statistics, Section 8.3, World Scientific Press, Singapore.
Sarma, Y. and Jammalamadaka, S. (1993). Circular Regression. Statistical Science and Data Analysis, 109-128. Proceeding of the Thrid Pacific Area Statistical Conference. VSP: Utrecht, Netherlands.
# NOT RUN {
# Generate a data set of dependent circular variables.
x <- circular(runif(50, 0, 2*pi))
y <- atan2(0.15*cos(x) + 0.25*sin(x), 0.35*sin(x)) +
rvonmises(n=50, mu=circular(0), kappa=5)
# Fit a circular-circular regression model.
circ.lm <- lm.circular(y, x, order=1)
# Obtain a crude plot of the data and fitted regression line.
plot.default(x, y)
circ.lm$fitted[circ.lm$fitted>pi] <- circ.lm$fitted[circ.lm$fitted>pi] - 2*pi
points.default(x[order(x)], circ.lm$fitted[order(x)], type='l')
# Fit a circular-linear regression model.
set.seed(1234)
x <- cbind(rnorm(10), rep(1, 10))
y <- circular(2*atan(c(x%*%c(5,1))))+rvonmises(10, mu=circular(0), kappa=100)
lm.circular(y=y, x=x, init=c(5,1), type='c-l', verbose=TRUE)
# }
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