pysteps.timeseries.autoregression.estimate_ar_params_ols¶
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pysteps.timeseries.autoregression.
estimate_ar_params_ols
(x, p, d=0, check_stationarity=True, include_constant_term=False, h=0, lam=0.0)¶ Estimate the parameters of an autoregressive AR(p) model
\(x_{k+1}=c+\phi_1 x_k+\phi_2 x_{k-1}+\dots+\phi_p x_{k-p}+\phi_{p+1}\epsilon\)
by using ordinary least squares (OLS). If \(d\geq 1\), the parameters are estimated for a d times differenced time series that is integrated back to the original one by summation of the differences.
Parameters: - x : array_like
Array of shape (n,…) containing a time series of length n=p+d+h+1. The remaining dimensions are flattened. The rows and columns of x represent time steps and samples, respectively.
- p : int
The order of the model.
- d : {0,1}
The order of differencing to apply to the time series.
- check_stationarity : bool
Check the stationarity of the estimated model.
- include_constant_term : bool
Include the constant term \(c\) to the model.
- h : int
If h>0, the fitting is done by using a history of length h in addition to the minimal required number of time steps n=p+d+1.
- lam : float
If lam>0, the regression is regularized by adding a penalty term (i.e. ridge regression).
Returns: - out : list
The estimated parameter matrices \(\mathbf{\Phi}_1,\mathbf{\Phi}_2, \dots,\mathbf{\Phi}_{p+1}\). If include_constant_term is True, the constant term \(c\) is added to the beginning of the list.
Notes
Estimation of the innovation term parameter \(\phi_{p+1}\) is currently implemented for p<=2. If p > 2, \(\phi_{p+1}\) is set to zero.