pmdarima.arima
.auto_arima¶
-
pmdarima.arima.
auto_arima
(y, exogenous=None, start_p=2, d=None, start_q=2, max_p=5, max_d=2, max_q=5, start_P=1, D=None, start_Q=1, max_P=2, max_D=1, max_Q=2, max_order=10, m=1, seasonal=True, stationary=False, information_criterion='aic', alpha=0.05, test='kpss', seasonal_test='ch', stepwise=True, n_jobs=1, start_params=None, trend=None, method=None, transparams=True, solver='lbfgs', maxiter=None, disp=0, callback=None, offset_test_args=None, seasonal_test_args=None, suppress_warnings=False, error_action='warn', trace=False, random=False, random_state=None, n_fits=10, return_valid_fits=False, out_of_sample_size=0, scoring='mse', scoring_args=None, with_intercept=True, **fit_args)[source][source]¶ Automatically discover the optimal order for an ARIMA model.
The
auto_arima
function seeks to identify the most optimal parameters for anARIMA
model, and returns a fitted ARIMA model. This function is based on the commonly-used R function,forecast::auto.arima
[3].The
auro_arima
function works by conducting differencing tests (i.e., Kwiatkowski–Phillips–Schmidt–Shin, Augmented Dickey-Fuller or Phillips–Perron) to determine the order of differencing,d
, and then fitting models within ranges of definedstart_p
,max_p
,start_q
,max_q
ranges. If theseasonal
optional is enabled,auto_arima
also seeks to identify the optimalP
andQ
hyper- parameters after conducting the Canova-Hansen to determine the optimal order of seasonal differencing,D
.In order to find the best model,
auto_arima
optimizes for a giveninformation_criterion
, one of {‘aic’, ‘aicc’, ‘bic’, ‘hqic’, ‘oob’} (Akaike Information Criterion, Corrected Akaike Information Criterion, Bayesian Information Criterion, Hannan-Quinn Information Criterion, or “out of bag”–for validation scoring–respectively) and returns the ARIMA which minimizes the value.Note that due to stationarity issues,
auto_arima
might not find a suitable model that will converge. If this is the case, aValueError
will be thrown suggesting stationarity-inducing measures be taken prior to re-fitting or that a new range oforder
values be selected. Non- stepwise (i.e., essentially a grid search) selection can be slow, especially for seasonal data. Stepwise algorithm is outlined in Hyndman and Khandakar (2008).Parameters: y : array-like or iterable, shape=(n_samples,)
The time-series to which to fit the
ARIMA
estimator. This may either be a PandasSeries
object (statsmodels can internally use the dates in the index), or a numpy array. This should be a one-dimensional array of floats, and should not contain anynp.nan
ornp.inf
values.exogenous : array-like, shape=[n_obs, n_vars], optional (default=None)
An optional 2-d array of exogenous variables. If provided, these variables are used as additional features in the regression operation. This should not include a constant or trend. Note that if an
ARIMA
is fit on exogenous features, it must be provided exogenous features for making predictions.start_p : int, optional (default=2)
The starting value of
p
, the order (or number of time lags) of the auto-regressive (“AR”) model. Must be a positive integer.d : int, optional (default=None)
The order of first-differencing. If None (by default), the value will automatically be selected based on the results of the
test
(i.e., either the Kwiatkowski–Phillips–Schmidt–Shin, Augmented Dickey-Fuller or the Phillips–Perron test will be conducted to find the most probable value). Must be a positive integer or None. Note that ifd
is None, the runtime could be significantly longer.start_q : int, optional (default=2)
The starting value of
q
, the order of the moving-average (“MA”) model. Must be a positive integer.max_p : int, optional (default=5)
The maximum value of
p
, inclusive. Must be a positive integer greater than or equal tostart_p
.max_d : int, optional (default=2)
The maximum value of
d
, or the maximum number of non-seasonal differences. Must be a positive integer greater than or equal tod
.max_q : int, optional (default=5)
The maximum value of
q
, inclusive. Must be a positive integer greater thanstart_q
.start_P : int, optional (default=1)
The starting value of
P
, the order of the auto-regressive portion of the seasonal model.D : int, optional (default=None)
The order of the seasonal differencing. If None (by default, the value will automatically be selected based on the results of the
seasonal_test
. Must be a positive integer or None.start_Q : int, optional (default=1)
The starting value of
Q
, the order of the moving-average portion of the seasonal model.max_P : int, optional (default=2)
The maximum value of
P
, inclusive. Must be a positive integer greater thanstart_P
.max_D : int, optional (default=1)
The maximum value of
D
. Must be a positive integer greater thanD
.max_Q : int, optional (default=2)
The maximum value of
Q
, inclusive. Must be a positive integer greater thanstart_Q
.max_order : int, optional (default=10)
If the sum of
p
andq
is >=max_order
, a model will not be fit with those parameters, but will progress to the next combination. Default is 5. Ifmax_order
is None, it means there are no constraints on maximum order.m : int, optional (default=1)
The period for seasonal differencing,
m
refers to the number of periods in each season. For example,m
is 4 for quarterly data, 12 for monthly data, or 1 for annual (non-seasonal) data. Default is 1. Note that ifm
== 1 (i.e., is non-seasonal),seasonal
will be set to False. For more information on setting this parameter, see Setting m.seasonal : bool, optional (default=True)
Whether to fit a seasonal ARIMA. Default is True. Note that if
seasonal
is True andm
== 1,seasonal
will be set to False.stationary : bool, optional (default=False)
Whether the time-series is stationary and
d
should be set to zero.information_criterion : str, optional (default=’aic’)
The information criterion used to select the best ARIMA model. One of
pmdarima.arima.auto_arima.VALID_CRITERIA
, (‘aic’, ‘bic’, ‘hqic’, ‘oob’).alpha : float, optional (default=0.05)
Level of the test for testing significance.
test : str, optional (default=’kpss’)
Type of unit root test to use in order to detect stationarity if
stationary
is False andd
is None. Default is ‘kpss’ (Kwiatkowski–Phillips–Schmidt–Shin).seasonal_test : str, optional (default=’ch’)
This determines which seasonal unit root test is used if
seasonal
is True andD
is None. Default is ‘ch’ (Canova-Hansen).stepwise : bool, optional (default=True)
Whether to use the stepwise algorithm outlined in Hyndman and Khandakar (2008) to identify the optimal model parameters. The stepwise algorithm can be significantly faster than fitting all (or a
random
subset of) hyper-parameter combinations and is less likely to over-fit the model.n_jobs : int, optional (default=1)
The number of models to fit in parallel in the case of a grid search (
stepwise=False
). Default is 1, but -1 can be used to designate “as many as possible”.start_params : array-like, optional (default=None)
Starting parameters for
ARMA(p,q)
. If None, the default is given byARMA._fit_start_params
.transparams : bool, optional (default=True)
Whether or not to transform the parameters to ensure stationarity. Uses the transformation suggested in Jones (1980). If False, no checking for stationarity or invertibility is done.
method : str, one of {‘css-mle’,’mle’,’css’}, optional (default=None)
This is the loglikelihood to maximize. If “css-mle”, the conditional sum of squares likelihood is maximized and its values are used as starting values for the computation of the exact likelihood via the Kalman filter. If “mle”, the exact likelihood is maximized via the Kalman Filter. If “css” the conditional sum of squares likelihood is maximized. All three methods use start_params as starting parameters. See above for more information. If fitting a seasonal ARIMA, the default is ‘lbfgs’
trend : str or None, optional (default=None)
The trend parameter. If
with_intercept
is True,trend
will be used. Ifwith_intercept
is False, the trend will be set to a no- intercept value.solver : str or None, optional (default=’lbfgs’)
Solver to be used. The default is ‘lbfgs’ (limited memory Broyden-Fletcher-Goldfarb-Shanno). Other choices are ‘bfgs’, ‘newton’ (Newton-Raphson), ‘nm’ (Nelder-Mead), ‘cg’ - (conjugate gradient), ‘ncg’ (non-conjugate gradient), and ‘powell’. By default, the limited memory BFGS uses m=12 to approximate the Hessian, projected gradient tolerance of 1e-8 and factr = 1e2. You can change these by using kwargs.
maxiter : int, optional (default=None)
The maximum number of function evaluations. Statsmodels defaults this value to 50 for SARIMAX models and 500 for ARIMA and ARMA models. If passed as None, will use the seasonal order to determine which to use (50 for seasonal, 500 otherwise).
disp : int, optional (default=0)
If True, convergence information is printed. For the default ‘lbfgs’
solver
, disp controls the frequency of the output during the iterations. disp < 0 means no output in this case.callback : callable, optional (default=None)
Called after each iteration as callback(xk) where xk is the current parameter vector. This is only used in non-seasonal ARIMA models.
offset_test_args : dict, optional (default=None)
The args to pass to the constructor of the offset (
d
) test. Seepmdarima.arima.stationarity
for more details.seasonal_test_args : dict, optional (default=None)
The args to pass to the constructor of the seasonal offset (
D
) test. Seepmdarima.arima.seasonality
for more details.suppress_warnings : bool, optional (default=False)
Many warnings might be thrown inside of statsmodels. If
suppress_warnings
is True, all of the warnings coming fromARIMA
will be squelched.error_action : str, optional (default=’warn’)
If unable to fit an
ARIMA
due to stationarity issues, whether to warn (‘warn’), raise theValueError
(‘raise’) or ignore (‘ignore’). Note that the default behavior is to warn, and fits that fail will be returned as None. This is the recommended behavior, as statsmodels ARIMA and SARIMAX models hit bugs periodically that can cause an otherwise healthy parameter combination to fail for reasons not related to pmdarima.trace : bool, optional (default=False)
Whether to print status on the fits. Note that this can be very verbose…
random : bool, optional (default=False)
Similar to grid searches,
auto_arima
provides the capability to perform a “random search” over a hyper-parameter space. Ifrandom
is True, rather than perform an exhaustive search orstepwise
search, onlyn_fits
ARIMA models will be fit (stepwise
must be False for this option to do anything).random_state : int, long or numpy
RandomState
, optional (default=None)The PRNG for when
random=True
. Ensures replicable testing and results.n_fits : int, optional (default=10)
If
random
is True and a “random search” is going to be performed,n_iter
is the number of ARIMA models to be fit.return_valid_fits : bool, optional (default=False)
If True, will return all valid ARIMA fits in a list. If False (by default), will only return the best fit.
out_of_sample_size : int, optional (default=0)
The
ARIMA
class can fit only a portion of the data if specified, in order to retain an “out of bag” sample score. This is the number of examples from the tail of the time series to hold out and use as validation examples. The model will not be fit on these samples, but the observations will be added into the model’sendog
andexog
arrays so that future forecast values originate from the end of the endogenous vector.For instance:
y = [0, 1, 2, 3, 4, 5, 6] out_of_sample_size = 2 > Fit on: [0, 1, 2, 3, 4] > Score on: [5, 6] > Append [5, 6] to end of self.arima_res_.data.endog values
scoring : str, optional (default=’mse’)
If performing validation (i.e., if
out_of_sample_size
> 0), the metric to use for scoring the out-of-sample data. One of {‘mse’, ‘mae’}scoring_args : dict, optional (default=None)
A dictionary of key-word arguments to be passed to the
scoring
metric.with_intercept : bool, optional (default=True)
Whether to include an intercept term. Default is True.
**fit_args : dict, optional (default=None)
A dictionary of keyword arguments to pass to the
ARIMA.fit()
method.See also
Notes
Fitting with stepwise=False can prove slower, especially when seasonal=True.
References
[R35] https://wikipedia.org/wiki/Autoregressive_integrated_moving_average [R36] R’s auto-arima source code: http://bit.ly/2gOh5z2 [R37] R’s auto-arima documentation: http://bit.ly/2wbBvUN