gofKernel: 2 dimensional gof test of Scaillet (2007)
In gofCopula: Goodness-of-Fit Tests for Copulae
Description
Usage
Arguments
Details
Value
References
Examples
Description
gofKernel tests a 2 dimensional dataset with the Scaillet test for a
copula. The possible copulae are "normal", "t",
"clayton", "gumbel", "frank", "joe",
"amh", "galambos", "huslerReiss", "tawn",
"tev", "fgm" and "plackett". The parameter
estimation is performed with pseudo maximum likelihood method. In case the
estimation fails, inversion of Kendall's tau is used. The approximate
p-values are computed with a parametric bootstrap, which computation can be
accelerated by enabling in-build parallel computation.
Usage
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gofKernel(
copula = c("normal", "t", "clayton", "gumbel", "frank", "joe", "amh", "galambos",
"huslerReiss", "tawn", "tev", "fgm", "plackett"),
x,
param = 0.5,
param.est = TRUE,
df = 4,
df.est = TRUE,
margins = "ranks",
flip = 0,
M = 1000,
MJ = 100,
dispstr = "ex",
delta.J = 0.5,
nodes.Integration = 12,
lower = NULL,
upper = NULL,
seed.active = NULL,
processes = 1
)
Arguments
copula
The copula to test for. Possible are "normal",
"t", "clayton", "gumbel", "frank", "joe",
"amh", "galambos", "huslerReiss", "tawn",
"tev", "fgm" and "plackett".
x
A matrix containing the data with rows being observations and
columns being variables.
param
The parameter to be used.
param.est
Shall be either TRUE or FALSE. TRUE
means that param will be estimated with a maximum likelihood
estimation.
df
Degrees of freedom, if not meant to be estimated. Only necessary
if tested for "t"-copula.
df.est
Indicates if df shall be estimated. Has to be either
FALSE or TRUE, where TRUE means that it will be
estimated.
margins
Specifies which estimation method for the margins shall be
used. The default is "ranks", which is the standard approach to
convert data in such a case. Alternatively the following distributions can
be specified: "beta", "cauchy", Chi-squared ("chisq"),
"f", "gamma", Log normal ("lnorm"), Normal
("norm"), "t", "weibull", Exponential ("exp").
Input can be either one method, e.g. "ranks", which will be used for
estimation of all data sequences. Also an individual method for each margin
can be specified, e.g. c("ranks", "norm", "t") for 3 data sequences.
If one does not want to estimate the margins, set it to NULL.
flip
The control parameter to flip the copula by 90, 180, 270 degrees
clockwise. Only applicable for bivariate copula. Default is 0 and possible
inputs are 0, 90, 180, 270 and NULL.
M
Number of bootstrapping loops.
MJ
Size of bootstrapping sample.
dispstr
A character string specifying the type of the symmetric
positive definite matrix characterizing the elliptical copula. Implemented
structures are "ex" for exchangeable and "un" for unstructured, see package
copula.
delta.J
Scaling parameter for the matrix of smoothing parameters.
nodes.Integration
Number of knots of the bivariate Gauss-Legendre
quadrature.
lower
Lower bound for the maximum likelihood estimation of the copula
parameter. The constraint is also active in the bootstrapping procedure. The
constraint is not active when a switch to inversion of Kendall's tau is
necessary. Default NULL.
upper
Upper bound for the maximum likelihood estimation of the copula
parameter. The constraint is also active in the bootstrapping procedure. The
constraint is not active when a switch to inversion of Kendall's tau is
necessary. Default NULL.
seed.active
Has to be either an integer or a vector of M+1 integers.
If an integer, then the seeds for the bootstrapping procedure will be
simulated. If M+1 seeds are provided, then these seeds are used in the
bootstrapping procedure. Defaults to NULL, then R generates
the seeds from the computer runtime. Controlling the seeds is useful for
reproducibility of a simulation study to compare the power of the tests or
for reproducibility of an empirical study.
processes
The number of parallel processes which are performed to
speed up the bootstrapping. Shouldn't be higher than the number of logical
processors. Please see the details.
Details
The Scaillet test is a kernel-based goodness-of-fit test with a fixed
smoothing parameter. For the copula density c(u,
theta), the corresponding kernel estimator is given by
c_n(u) = 1/n sum(K_H[u - (U[i1], ..., U[id])^T],
i=1 ,..., n),
where U[ij] for i = 1,
...,n; j = 1, ...,d are the pseudo observations,
u in [0,1]^d and KH(y) = K(H^(-1)y)/det(H) for which a bivariate
quadratic kernel is used, as in Scaillet (2007). The matrix of smoothing
parameters is H = 2.6073n^{-1/6}
{Sigma_hat}^{1/2} with Sigma_hat the sample covariance
matrix. The test statistic is then given by
int_([0,1]^d) {c_n(u) - K_H * c(u, theta_n)} omega(u) d u,
where * denotes the convolution operator and omega is
a weight function, see Zhang et al. (2015). The bivariate Gauss-Legendre
quadrature method is used to compute the integral in the test statistic
numerically, see Scaillet (2007).
The approximate p-value is computed by the formula
sum(|T[b]| >= |T|, b=1, .., M) / M,
For small values of M, initializing the parallelisation via
processes does not make sense. The registration of the parallel
processes increases the computation time. Please consider to enable
parallelisation just for high values of M.
Value
An object of the class gofCOP with the components
method
a character which informs about the performed analysis
copula
the copula tested for
margins
the method used to
estimate the margin distribution.
param.margins
the parameters of
the estimated margin distributions. Only applicable if the margins were not
specified as "ranks" or NULL.
theta
dependence
parameters of the copulae
df
the degrees of freedem of the copula.
Only applicable for t-copula.
res.tests
a matrix with the p-values
and test statistics of the hybrid and the individual tests
References
Zhang, S., Okhrin, O., Zhou, Q., and Song, P.. Goodness-of-fit
Test For Specification of Semiparametric Copula Dependence Models.
Journal of Econometrics, 193, 2016, pp. 215-233
doi: 10.1016/j.jeconom.2016.02.017
Scaillet, O.
(2007). Kernel based goodness-of-fit tests for copulas with fixed smoothing
parameters. Journal of Multivariate Analysis, 98:533-543
Examples
1
2
3
data(IndexReturns2D)
gofKernel("normal", IndexReturns2D, M = 5, MJ = 5)
gofCopula documentation built on April 22, 2021, 5:10 p.m.
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Description Usage Arguments Details Value References Examples
Description
gofKernel tests a 2 dimensional dataset with the Scaillet test for a
copula. The possible copulae are "normal", "t",
"clayton", "gumbel", "frank", "joe",
"amh", "galambos", "huslerReiss", "tawn",
"tev", "fgm" and "plackett". The parameter
estimation is performed with pseudo maximum likelihood method. In case the
estimation fails, inversion of Kendall's tau is used. The approximate
p-values are computed with a parametric bootstrap, which computation can be
accelerated by enabling in-build parallel computation.
Usage
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 | gofKernel(
copula = c("normal", "t", "clayton", "gumbel", "frank", "joe", "amh", "galambos",
"huslerReiss", "tawn", "tev", "fgm", "plackett"),
x,
param = 0.5,
param.est = TRUE,
df = 4,
df.est = TRUE,
margins = "ranks",
flip = 0,
M = 1000,
MJ = 100,
dispstr = "ex",
delta.J = 0.5,
nodes.Integration = 12,
lower = NULL,
upper = NULL,
seed.active = NULL,
processes = 1
)
|
Arguments
copula |
The copula to test for. Possible are |
x |
A matrix containing the data with rows being observations and columns being variables. |
param |
The parameter to be used. |
param.est |
Shall be either |
df |
Degrees of freedom, if not meant to be estimated. Only necessary
if tested for |
df.est |
Indicates if |
margins |
Specifies which estimation method for the margins shall be
used. The default is |
flip |
The control parameter to flip the copula by 90, 180, 270 degrees clockwise. Only applicable for bivariate copula. Default is 0 and possible inputs are 0, 90, 180, 270 and NULL. |
M |
Number of bootstrapping loops. |
MJ |
Size of bootstrapping sample. |
dispstr |
A character string specifying the type of the symmetric
positive definite matrix characterizing the elliptical copula. Implemented
structures are "ex" for exchangeable and "un" for unstructured, see package
|
delta.J |
Scaling parameter for the matrix of smoothing parameters. |
nodes.Integration |
Number of knots of the bivariate Gauss-Legendre quadrature. |
lower |
Lower bound for the maximum likelihood estimation of the copula
parameter. The constraint is also active in the bootstrapping procedure. The
constraint is not active when a switch to inversion of Kendall's tau is
necessary. Default |
upper |
Upper bound for the maximum likelihood estimation of the copula
parameter. The constraint is also active in the bootstrapping procedure. The
constraint is not active when a switch to inversion of Kendall's tau is
necessary. Default |
seed.active |
Has to be either an integer or a vector of M+1 integers.
If an integer, then the seeds for the bootstrapping procedure will be
simulated. If M+1 seeds are provided, then these seeds are used in the
bootstrapping procedure. Defaults to |
processes |
The number of parallel processes which are performed to speed up the bootstrapping. Shouldn't be higher than the number of logical processors. Please see the details. |
Details
The Scaillet test is a kernel-based goodness-of-fit test with a fixed smoothing parameter. For the copula density c(u, theta), the corresponding kernel estimator is given by
c_n(u) = 1/n sum(K_H[u - (U[i1], ..., U[id])^T], i=1 ,..., n),
where U[ij] for i = 1, ...,n; j = 1, ...,d are the pseudo observations, u in [0,1]^d and KH(y) = K(H^(-1)y)/det(H) for which a bivariate quadratic kernel is used, as in Scaillet (2007). The matrix of smoothing parameters is H = 2.6073n^{-1/6} {Sigma_hat}^{1/2} with Sigma_hat the sample covariance matrix. The test statistic is then given by
int_([0,1]^d) {c_n(u) - K_H * c(u, theta_n)} omega(u) d u,
where * denotes the convolution operator and omega is a weight function, see Zhang et al. (2015). The bivariate Gauss-Legendre quadrature method is used to compute the integral in the test statistic numerically, see Scaillet (2007).
The approximate p-value is computed by the formula
sum(|T[b]| >= |T|, b=1, .., M) / M,
For small values of M, initializing the parallelisation via
processes does not make sense. The registration of the parallel
processes increases the computation time. Please consider to enable
parallelisation just for high values of M.
Value
An object of the class gofCOP with the components
method |
a character which informs about the performed analysis |
copula |
the copula tested for |
margins |
the method used to estimate the margin distribution. |
param.margins |
the parameters of
the estimated margin distributions. Only applicable if the margins were not
specified as |
theta |
dependence parameters of the copulae |
df |
the degrees of freedem of the copula. Only applicable for t-copula. |
res.tests |
a matrix with the p-values and test statistics of the hybrid and the individual tests |
References
Zhang, S., Okhrin, O., Zhou, Q., and Song, P.. Goodness-of-fit
Test For Specification of Semiparametric Copula Dependence Models.
Journal of Econometrics, 193, 2016, pp. 215-233
doi: 10.1016/j.jeconom.2016.02.017
Scaillet, O.
(2007). Kernel based goodness-of-fit tests for copulas with fixed smoothing
parameters. Journal of Multivariate Analysis, 98:533-543
Examples
1 2 3 | data(IndexReturns2D)
gofKernel("normal", IndexReturns2D, M = 5, MJ = 5)
|
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