Exemple #1
0
    def _estimate_svar(self,
                       start_params,
                       lags,
                       maxiter,
                       maxfun,
                       trend='c',
                       solver="nm",
                       override=False):
        """
        lags : int
        trend : string or None
            As per above
        """
        k_trend = util.get_trendorder(trend)
        y = self.endog
        z = util.get_var_endog(y, lags, trend=trend)
        y_sample = y[lags:]

        # Lutkepohl p75, about 5x faster than stated formula
        var_params = np.linalg.lstsq(z, y_sample)[0]
        resid = y_sample - np.dot(z, var_params)

        # Unbiased estimate of covariance matrix $\Sigma_u$ of the white noise
        # process $u$
        # equivalent definition
        # .. math:: \frac{1}{T - Kp - 1} Y^\prime (I_T - Z (Z^\prime Z)^{-1}
        # Z^\prime) Y
        # Ref: Lutkepohl p.75
        # df_resid right now is T - Kp - 1, which is a suggested correction

        avobs = len(y_sample)

        df_resid = avobs - (self.neqs * lags + k_trend)

        sse = np.dot(resid.T, resid)
        #TODO: should give users the option to use a dof correction or not
        omega = sse / df_resid
        self.sigma_u = omega

        A, B = self._solve_AB(start_params,
                              override=override,
                              solver=solver,
                              maxiter=maxiter,
                              maxfun=maxfun)
        A_mask = self.A_mask
        B_mask = self.B_mask

        return SVARResults(y,
                           z,
                           var_params,
                           omega,
                           lags,
                           names=self.endog_names,
                           trend=trend,
                           dates=self._data.dates,
                           model=self,
                           A=A,
                           B=B,
                           A_mask=A_mask,
                           B_mask=B_mask)
Exemple #2
0
    def _estimate_var(self, lags, offset=0, trend='c'):
        """
        lags : int
        offset : int
            Periods to drop from beginning-- for order selection so it's an
            apples-to-apples comparison
        trend : string or None
            As per above
        """
        # have to do this again because select_order doesn't call fit
        self.k_trend = k_trend = util.get_trendorder(trend)

        if offset < 0:  # pragma: no cover
            raise ValueError('offset must be >= 0')

        y = self.y[offset:]

        z = util.get_var_endog(y, lags, trend=trend)
        y_sample = y[lags:]

        # Lutkepohl p75, about 5x faster than stated formula
        params = np.linalg.lstsq(z, y_sample)[0]
        resid = y_sample - np.dot(z, params)

        # Unbiased estimate of covariance matrix $\Sigma_u$ of the white noise
        # process $u$
        # equivalent definition
        # .. math:: \frac{1}{T - Kp - 1} Y^\prime (I_T - Z (Z^\prime Z)^{-1}
        # Z^\prime) Y
        # Ref: Lutkepohl p.75
        # df_resid right now is T - Kp - 1, which is a suggested correction

        avobs = len(y_sample)

        df_resid = avobs - (self.neqs * lags + k_trend)

        sse = np.dot(resid.T, resid)
        omega = sse / df_resid

        varfit = VARResults(y,
                            z,
                            params,
                            omega,
                            lags,
                            names=self.endog_names,
                            trend=trend,
                            dates=self._data.dates,
                            model=self)
        return VARResultsWrapper(varfit)
    def _estimate_svar(self, start_params, lags, maxiter, maxfun,
                       trend='c', solver="nm", override=False):
        """
        lags : int
        trend : string or None
            As per above
        """
        k_trend = util.get_trendorder(trend)
        y = self.endog
        z = util.get_var_endog(y, lags, trend=trend)
        y_sample = y[lags:]

        # Lutkepohl p75, about 5x faster than stated formula
        var_params = np.linalg.lstsq(z, y_sample)[0]
        resid = y_sample - np.dot(z, var_params)

        # Unbiased estimate of covariance matrix $\Sigma_u$ of the white noise
        # process $u$
        # equivalent definition
        # .. math:: \frac{1}{T - Kp - 1} Y^\prime (I_T - Z (Z^\prime Z)^{-1}
        # Z^\prime) Y
        # Ref: Lutkepohl p.75
        # df_resid right now is T - Kp - 1, which is a suggested correction

        avobs = len(y_sample)

        df_resid = avobs - (self.neqs * lags + k_trend)

        sse = np.dot(resid.T, resid)
        #TODO: should give users the option to use a dof correction or not
        omega = sse / df_resid
        self.sigma_u = omega

        A, B = self._solve_AB(start_params, override=override,
                                                    solver=solver,
                                                    maxiter=maxiter,
                                                    maxfun=maxfun)
        A_mask = self.A_mask
        B_mask = self.B_mask

        return SVARResults(y, z, var_params, omega, lags,
                            names=self.endog_names, trend=trend,
                            dates=self._data.dates, model=self,
                           A=A, B=B, A_mask=A_mask, B_mask=B_mask)
    def _estimate_var(self, lags, offset=0, trend='c'):
        """
        lags : int
        offset : int
            Periods to drop from beginning-- for order selection so it's an
            apples-to-apples comparison
        trend : string or None
            As per above
        """
        # have to do this again because select_order doesn't call fit
        self.k_trend = k_trend = util.get_trendorder(trend)

        if offset < 0: # pragma: no cover
            raise ValueError('offset must be >= 0')

        y = self.y[offset:]

        z = util.get_var_endog(y, lags, trend=trend)
        y_sample = y[lags:]

        # Lutkepohl p75, about 5x faster than stated formula
        params = np.linalg.lstsq(z, y_sample)[0]
        resid = y_sample - np.dot(z, params)

        # Unbiased estimate of covariance matrix $\Sigma_u$ of the white noise
        # process $u$
        # equivalent definition
        # .. math:: \frac{1}{T - Kp - 1} Y^\prime (I_T - Z (Z^\prime Z)^{-1}
        # Z^\prime) Y
        # Ref: Lutkepohl p.75
        # df_resid right now is T - Kp - 1, which is a suggested correction

        avobs = len(y_sample)

        df_resid = avobs - (self.neqs * lags + k_trend)

        sse = np.dot(resid.T, resid)
        omega = sse / df_resid

        varfit = VARResults(y, z, params, omega, lags, names=self.endog_names,
                          trend=trend, dates=self._data.dates, model=self)
        return VARResultsWrapper(varfit)
    def predict(self, params, start=None, end=None, lags=1, trend='c'):
        """
        Returns in-sample predictions or forecasts
        """
        start = self._get_predict_start(start, lags)
        end, out_of_sample = self._get_predict_end(end)

        if end < start:
            raise ValueError("end is before start")
        if end == start + out_of_sample:
            return np.array([])

        k_trend = util.get_trendorder(trend)
        k = self.neqs
        k_ar = lags

        predictedvalues = np.zeros((end + 1 - start + out_of_sample, k))
        if k_trend != 0:
            intercept = params[:k_trend]
            predictedvalues += intercept

        y = self.y
        X = util.get_var_endog(y, lags, trend=trend)
        fittedvalues = np.dot(X, params)

        fv_start = start - k_ar
        pv_end = min(len(predictedvalues), len(fittedvalues) - fv_start)
        fv_end = min(len(fittedvalues), end-k_ar+1)
        predictedvalues[:pv_end] = fittedvalues[fv_start:fv_end]

        if not out_of_sample:
            return predictedvalues

        # fit out of sample
        y = y[-k_ar:]
        coefs = params[k_trend:].reshape((k_ar, k, k)).swapaxes(1,2)
        predictedvalues[pv_end:] = forecast(y, coefs, intercept, out_of_sample)
        return predictedvalues
Exemple #6
0
    def predict(self, params, start=None, end=None, lags=1, trend='c'):
        """
        Returns in-sample predictions or forecasts
        """
        start = self._get_predict_start(start, lags)
        end, out_of_sample = self._get_predict_end(end)

        if end < start:
            raise ValueError("end is before start")
        if end == start + out_of_sample:
            return np.array([])

        k_trend = util.get_trendorder(trend)
        k = self.neqs
        k_ar = lags

        predictedvalues = np.zeros((end + 1 - start + out_of_sample, k))
        if k_trend != 0:
            intercept = params[:k_trend]
            predictedvalues += intercept

        y = self.y
        X = util.get_var_endog(y, lags, trend=trend)
        fittedvalues = np.dot(X, params)

        fv_start = start - k_ar
        pv_end = min(len(predictedvalues), len(fittedvalues) - fv_start)
        fv_end = min(len(fittedvalues), end - k_ar + 1)
        predictedvalues[:pv_end] = fittedvalues[fv_start:fv_end]

        if not out_of_sample:
            return predictedvalues

        # fit out of sample
        y = y[-k_ar:]
        coefs = params[k_trend:].reshape((k_ar, k, k)).swapaxes(1, 2)
        predictedvalues[pv_end:] = forecast(y, coefs, intercept, out_of_sample)
        return predictedvalues