ingarch.analytical: Analytical Mean, Variance and Autocorrelation of an INGARCH...
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ingarch.analytical R Documentation
Analytical Mean, Variance and Autocorrelation of an INGARCH Process
Description
Functions to calculate the analytical mean, variance and autocorrelation / partial autocorrelation / autocovariance function of an integer-valued generalised autoregressive conditional heteroscedasticity (INGARCH) process.
Usage
ingarch.mean(intercept, past_obs=NULL, past_mean=NULL)
ingarch.var(intercept, past_obs=NULL, past_mean=NULL)
ingarch.acf(intercept, past_obs=NULL, past_mean=NULL, lag.max=10,
type=c("acf", "pacf", "acvf"), plot=TRUE, ...)
Arguments
intercept
numeric positive value for the intercept \beta_0.
past_obs
numeric non-negative vector containing the coefficients \beta_1,\ldots, \beta_p for regression on previous observations (see Details).
past_mean
numeric non-negative vector containing the coefficients \alpha_1,\ldots, \alpha_q for regression on previous conditional means (see Details).
lag.max
integer value indicating how many lags of the (partial) autocorrelation / autocovariance function should be calculated.
type
character. If type="acf" (the default) the autocorrelation function is calculated, "pacf" gives the partial autocorrelation function and "acvf" the autocovariance function.
plot
logical. If plot=TRUE (the default) the values are plotted and returned invisible.
...
additional arguments to be passed to function plot.
Details
The INGARCH model of order p and q used here follows the definition
Z_{t}|{\cal{F}}_{t-1} \sim \mathrm{Poi}(\kappa_{t}),
where {\cal{F}}_{t-1} is the history of the process up to time t-1 and \mathrm{Poi} is the Poisson distribution parametrised by its mean (cf. Ferland et al., 2006).
The conditional mean \kappa_t is given by
\kappa_t = \beta_0 + \beta_1 Z_{t-1} + \ldots + \beta_p Z_{t-p}
+ \alpha_1 \kappa_{t-1} + \ldots + \alpha_q \kappa_{t-q}.
The function ingarch.acf depends on the function tacvfARMA from package ltsa, which needs to be installed.
Author(s)
Tobias Liboschik
References
Ferland, R., Latour, A. and Oraichi, D. (2006) Integer-valued GARCH process. Journal of Time Series Analysis 27(6), 923–942, http://dx.doi.org/10.1111/j.1467-9892.2006.00496.x.
See Also
tsglm for fitting a more genereal GLM for time series of counts of which this INGARCH model is a special case. tsglm.sim for simulation from such a model.
Examples
ingarch.mean(0.3, c(0.1,0.1), 0.1)
## Not run:
ingarch.var(0.3, c(0.1,0.1), 0.1)
ingarch.acf(0.3, c(0.1,0.1,0.1), 0.1, type="acf", lag.max=15)
## End(Not run)
tscount documentation built on May 11, 2023, 3:04 p.m.
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| ingarch.analytical | R Documentation |
Analytical Mean, Variance and Autocorrelation of an INGARCH Process
Description
Functions to calculate the analytical mean, variance and autocorrelation / partial autocorrelation / autocovariance function of an integer-valued generalised autoregressive conditional heteroscedasticity (INGARCH) process.
Usage
ingarch.mean(intercept, past_obs=NULL, past_mean=NULL)
ingarch.var(intercept, past_obs=NULL, past_mean=NULL)
ingarch.acf(intercept, past_obs=NULL, past_mean=NULL, lag.max=10,
type=c("acf", "pacf", "acvf"), plot=TRUE, ...)
Arguments
intercept |
numeric positive value for the intercept |
past_obs |
numeric non-negative vector containing the coefficients |
past_mean |
numeric non-negative vector containing the coefficients |
lag.max |
integer value indicating how many lags of the (partial) autocorrelation / autocovariance function should be calculated. |
type |
character. If |
plot |
logical. If |
... |
additional arguments to be passed to function |
Details
The INGARCH model of order p and q used here follows the definition
Z_{t}|{\cal{F}}_{t-1} \sim \mathrm{Poi}(\kappa_{t}),
where {\cal{F}}_{t-1} is the history of the process up to time t-1 and \mathrm{Poi} is the Poisson distribution parametrised by its mean (cf. Ferland et al., 2006).
The conditional mean \kappa_t is given by
\kappa_t = \beta_0 + \beta_1 Z_{t-1} + \ldots + \beta_p Z_{t-p}
+ \alpha_1 \kappa_{t-1} + \ldots + \alpha_q \kappa_{t-q}.
The function ingarch.acf depends on the function tacvfARMA from package ltsa, which needs to be installed.
Author(s)
Tobias Liboschik
References
Ferland, R., Latour, A. and Oraichi, D. (2006) Integer-valued GARCH process. Journal of Time Series Analysis 27(6), 923–942, http://dx.doi.org/10.1111/j.1467-9892.2006.00496.x.
See Also
tsglm for fitting a more genereal GLM for time series of counts of which this INGARCH model is a special case. tsglm.sim for simulation from such a model.
Examples
ingarch.mean(0.3, c(0.1,0.1), 0.1)
## Not run:
ingarch.var(0.3, c(0.1,0.1), 0.1)
ingarch.acf(0.3, c(0.1,0.1,0.1), 0.1, type="acf", lag.max=15)
## End(Not run)
R Package Documentation
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