BoxPierce: The Univariate-Multivariate Box and Pierce Portmanteau Test
In portes: Portmanteau Tests for Time Series Models
BoxPierce R Documentation
The Univariate-Multivariate Box and Pierce Portmanteau Test
Description
The univariate or multivariate Box-Pierce (1970) portmanteau test.
Usage
BoxPierce(obj,lags=seq(5,30,5),fitdf=0,sqrd.res=FALSE)
Arguments
obj
a univariate or multivariate series with class "numeric", "matrix",
"ts", or ("mts" "ts").
It can be also an object of fitted time-series model with class "ar",
"arima0", "Arima", ("ARIMA forecast ARIMA Arima"), "lm",
("glm" "lm"), or "varest".
obj may also an object with class "list" (see details and following examples).
lags
vector of lag auto-cross correlation coefficients used for Hosking test.
fitdf
Default is zero for testing the randomness of a given sequence with
class "numeric", "matrix", "ts", or ("mts" "ts").
In general fitdf equals to the number of estimated parameters in the fitted model.
If obj is an object with class "ar", "arima0", "Arima",
"varest", ("ARIMA forecast ARIMA Arima"), or "list" then no need to enter
the value of fitdf as it will be automatically determined.
For obj with other classes, the fitdf is needed for degrees
of freedom of asymptotic chi-square distribution.
sqrd.res
if TRUE then apply the test on the squared values.
This checks for Autoregressive Conditional Heteroscedastic,
ARCH, effects.
When sqrd.res = FALSE, then apply the test on the usual residuals.
Details
However the portmanteau test statistic can be applied directly on the output objects from
the built in R functions ar(), ar.ols(), ar.burg(),
ar.yw(), ar.mle(), arima(), arim0(), Arima(),
auto.arima(), lm(), glm(), and VAR(),
it works with output objects from any fitted model.
In this case, users should write their own function to fit any model they want, where they
may use the built in R functions garch(), garchFit(),
fracdiff(), tar(), etc.
The object obj represents the output of this function.
This output must be a list with at least two outcomes:
the fitted residual and the fitdf of the fitted model (list(res = ..., fitdf = ...)).
See the following example with the function FitModel().
Note: In stats R, the function Box.test was built to compute
the Box and Pierce (1970) and Ljung and Box (1978) test statistics
only in the univariate case where we can not use more than one single lag value at a time.
The functions BoxPierce and LjungBox are more accurate than
Box.test function and can be used in the univariate or multivariate time series
at vector of different lag values as well as they can be applied on an output object
from a fitted model described in the description of the function BoxPierce.
Value
The Box and Pierce univariate or multivariate test statistic with the associated p-values
for different lags based on the asymptotic chi-square distribution with k^2(lags-fitdf) degrees of freedom.
Author(s)
Esam Mahdi and A.I. McLeod.
References
Box, G.E.P. and Pierce, D.A. (1970). "Distribution of Residual Autocorrelation in Autoregressive-Integrated Moving Average
Time Series Models". Journal of American Statistical Association, 65, 1509-1526.
See Also
Box.test, LjungBox, MahdiMcLeod, Hosking,
LiMcLeod, portest, GetResiduals.
Examples
x <- rnorm(100)
BoxPierce(x) ## univariate test
x <- cbind(rnorm(100),rnorm(100))
BoxPierce(x) ## multivariate test
##
##
## Annual flow of the river Nile at Aswan - 1871 to 1970
fit <- arima(Nile, c(1, 0, 1))
lags <- c(5, 10, 20)
## Apply the univariate test statistic on the fitted model
BoxPierce(fit, lags) ## Correct (no need to specify fitdf)
BoxPierce(fit, lags, fitdf = 2) ## Correct
## Apply the test statistic on the residuals and set fitdf = 2
res <- resid(fit)
BoxPierce(res, lags) ## Wrong (fitdf is needed!)
BoxPierce(res, lags, fitdf = 2) ## Correct
##
##
## Quarterly, west German investment, income, and consumption from 1960 Q1 to 1982 Q4
data(WestGerman)
DiffData <- matrix(numeric(3 * 91), ncol = 3)
for (i in 1:3)
DiffData[, i] <- diff(log(WestGerman[, i]), lag = 1)
fit <- ar.ols(DiffData, intercept = TRUE, order.max = 2)
lags <- c(5,10)
## Apply the test statistic on the fitted model
BoxPierce(fit,lags) ## Correct (no need to specify fitdf)
## Apply the test statistic on the residuals where fitdf = 2
res <- ts(na.omit(fit$resid))
BoxPierce(res,lags) ## Wrong (fitdf is needed!)
BoxPierce(res,lags,fitdf = 2) ## Correct
##
##
## Monthly log stock returns of Intel corporation data: Test for ARCH Effects
monthintel <- as.ts(monthintel)
BoxPierce(monthintel) ## Usual test
BoxPierce(monthintel,sqrd.res=TRUE) ## Test for ARCH effects
##
#### Write a function to fit a model: Apply portmanteau test on fitted obj with class "list"
## Example
FitModel <- function(data){
fit <- ar.ols(data, intercept = TRUE, order.max = 2)
fitdf <- 2
res <- ts(na.omit(fit$resid))
list(res=res,fitdf=fitdf)
}
data(WestGerman)
DiffData <- matrix(numeric(3 * 91), ncol = 3)
for (i in 1:3)
DiffData[, i] <- diff(log(WestGerman[, i]), lag = 1)
Fit <- FitModel(DiffData)
BoxPierce(Fit)
portes documentation built on July 9, 2023, 5:07 p.m.
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| BoxPierce | R Documentation |
The Univariate-Multivariate Box and Pierce Portmanteau Test
Description
The univariate or multivariate Box-Pierce (1970) portmanteau test.
Usage
BoxPierce(obj,lags=seq(5,30,5),fitdf=0,sqrd.res=FALSE)
Arguments
obj |
a univariate or multivariate series with class |
lags |
vector of lag auto-cross correlation coefficients used for |
fitdf |
Default is zero for testing the randomness of a given sequence with
class |
sqrd.res |
if |
Details
However the portmanteau test statistic can be applied directly on the output objects from
the built in R functions ar(), ar.ols(), ar.burg(),
ar.yw(), ar.mle(), arima(), arim0(), Arima(),
auto.arima(), lm(), glm(), and VAR(),
it works with output objects from any fitted model.
In this case, users should write their own function to fit any model they want, where they
may use the built in R functions garch(), garchFit(),
fracdiff(), tar(), etc.
The object obj represents the output of this function.
This output must be a list with at least two outcomes:
the fitted residual and the fitdf of the fitted model (list(res = ..., fitdf = ...)).
See the following example with the function FitModel().
Note: In stats R, the function Box.test was built to compute
the Box and Pierce (1970) and Ljung and Box (1978) test statistics
only in the univariate case where we can not use more than one single lag value at a time.
The functions BoxPierce and LjungBox are more accurate than
Box.test function and can be used in the univariate or multivariate time series
at vector of different lag values as well as they can be applied on an output object
from a fitted model described in the description of the function BoxPierce.
Value
The Box and Pierce univariate or multivariate test statistic with the associated p-values
for different lags based on the asymptotic chi-square distribution with k^2(lags-fitdf) degrees of freedom.
Author(s)
Esam Mahdi and A.I. McLeod.
References
Box, G.E.P. and Pierce, D.A. (1970). "Distribution of Residual Autocorrelation in Autoregressive-Integrated Moving Average Time Series Models". Journal of American Statistical Association, 65, 1509-1526.
See Also
Box.test, LjungBox, MahdiMcLeod, Hosking,
LiMcLeod, portest, GetResiduals.
Examples
x <- rnorm(100)
BoxPierce(x) ## univariate test
x <- cbind(rnorm(100),rnorm(100))
BoxPierce(x) ## multivariate test
##
##
## Annual flow of the river Nile at Aswan - 1871 to 1970
fit <- arima(Nile, c(1, 0, 1))
lags <- c(5, 10, 20)
## Apply the univariate test statistic on the fitted model
BoxPierce(fit, lags) ## Correct (no need to specify fitdf)
BoxPierce(fit, lags, fitdf = 2) ## Correct
## Apply the test statistic on the residuals and set fitdf = 2
res <- resid(fit)
BoxPierce(res, lags) ## Wrong (fitdf is needed!)
BoxPierce(res, lags, fitdf = 2) ## Correct
##
##
## Quarterly, west German investment, income, and consumption from 1960 Q1 to 1982 Q4
data(WestGerman)
DiffData <- matrix(numeric(3 * 91), ncol = 3)
for (i in 1:3)
DiffData[, i] <- diff(log(WestGerman[, i]), lag = 1)
fit <- ar.ols(DiffData, intercept = TRUE, order.max = 2)
lags <- c(5,10)
## Apply the test statistic on the fitted model
BoxPierce(fit,lags) ## Correct (no need to specify fitdf)
## Apply the test statistic on the residuals where fitdf = 2
res <- ts(na.omit(fit$resid))
BoxPierce(res,lags) ## Wrong (fitdf is needed!)
BoxPierce(res,lags,fitdf = 2) ## Correct
##
##
## Monthly log stock returns of Intel corporation data: Test for ARCH Effects
monthintel <- as.ts(monthintel)
BoxPierce(monthintel) ## Usual test
BoxPierce(monthintel,sqrd.res=TRUE) ## Test for ARCH effects
##
#### Write a function to fit a model: Apply portmanteau test on fitted obj with class "list"
## Example
FitModel <- function(data){
fit <- ar.ols(data, intercept = TRUE, order.max = 2)
fitdf <- 2
res <- ts(na.omit(fit$resid))
list(res=res,fitdf=fitdf)
}
data(WestGerman)
DiffData <- matrix(numeric(3 * 91), ncol = 3)
for (i in 1:3)
DiffData[, i] <- diff(log(WestGerman[, i]), lag = 1)
Fit <- FitModel(DiffData)
BoxPierce(Fit)
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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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