+# ==============================================================================
+def EnsembleOfCenteredPerturbations( _bgcenter, _bgcovariance, _nbmembers ):
+ "Génération d'un ensemble de taille _nbmembers-1 d'états aléatoires centrés"
+ #
+ _bgcenter = numpy.ravel(_bgcenter)[:,None]
+ if _nbmembers < 1:
+ raise ValueError("Number of members has to be strictly more than 1 (given number: %s)."%(str(_nbmembers),))
+ #
+ if _bgcovariance is None:
+ BackgroundEnsemble = numpy.tile( _bgcenter, _nbmembers)
+ else:
+ _Z = numpy.random.multivariate_normal(numpy.zeros(_bgcenter.size), _bgcovariance, size=_nbmembers).T
+ BackgroundEnsemble = numpy.tile( _bgcenter, _nbmembers) + _Z
+ #
+ return BackgroundEnsemble
+
+# ==============================================================================
+def EnsembleOfBackgroundPerturbations( _bgcenter, _bgcovariance, _nbmembers, _withSVD = True):
+ "Génération d'un ensemble de taille _nbmembers-1 d'états aléatoires centrés"
+ def __CenteredRandomAnomalies(Zr, N):
+ """
+ Génère une matrice de N anomalies aléatoires centrées sur Zr selon les
+ notes manuscrites de MB et conforme au code de PS avec eps = -1
+ """
+ eps = -1
+ Q = numpy.identity(N-1)-numpy.ones((N-1,N-1))/numpy.sqrt(N)/(numpy.sqrt(N)-eps)
+ Q = numpy.concatenate((Q, [eps*numpy.ones(N-1)/numpy.sqrt(N)]), axis=0)
+ R, _ = numpy.linalg.qr(numpy.random.normal(size = (N-1,N-1)))
+ Q = numpy.dot(Q,R)
+ Zr = numpy.dot(Q,Zr)
+ return Zr.T
+ #
+ _bgcenter = numpy.ravel(_bgcenter).reshape((-1,1))
+ if _nbmembers < 1:
+ raise ValueError("Number of members has to be strictly more than 1 (given number: %s)."%(str(_nbmembers),))
+ if _bgcovariance is None:
+ BackgroundEnsemble = numpy.tile( _bgcenter, _nbmembers)
+ else:
+ if _withSVD:
+ U, s, V = numpy.linalg.svd(_bgcovariance, full_matrices=False)
+ _nbctl = _bgcenter.size
+ if _nbmembers > _nbctl:
+ _Z = numpy.concatenate((numpy.dot(
+ numpy.diag(numpy.sqrt(s[:_nbctl])), V[:_nbctl]),
+ numpy.random.multivariate_normal(numpy.zeros(_nbctl),_bgcovariance,_nbmembers-1-_nbctl)), axis = 0)
+ else:
+ _Z = numpy.dot(numpy.diag(numpy.sqrt(s[:_nbmembers-1])), V[:_nbmembers-1])
+ _Zca = __CenteredRandomAnomalies(_Z, _nbmembers)
+ BackgroundEnsemble = _bgcenter + _Zca
+ else:
+ if max(abs(_bgcovariance.flatten())) > 0:
+ _nbctl = _bgcenter.size
+ _Z = numpy.random.multivariate_normal(numpy.zeros(_nbctl),_bgcovariance,_nbmembers-1)
+ _Zca = __CenteredRandomAnomalies(_Z, _nbmembers)
+ BackgroundEnsemble = _bgcenter + _Zca
+ else:
+ BackgroundEnsemble = numpy.tile( _bgcenter, _nbmembers)
+ #
+ return BackgroundEnsemble
+
+# ==============================================================================
+def EnsembleOfAnomalies( Ensemble, OptMean = None, Normalisation = 1.):
+ "Renvoie les anomalies centrées à partir d'un ensemble TailleEtat*NbMembres"
+ if OptMean is None:
+ __Em = numpy.asarray(Ensemble).mean(axis=1, dtype=mfp).astype('float').reshape((-1,1))
+ else:
+ __Em = numpy.ravel(OptMean).reshape((-1,1))
+ #
+ return Normalisation * (numpy.asarray(Ensemble) - __Em)
+
+# ==============================================================================
+def EnsembleErrorCovariance( Ensemble ):
+ "Renvoie la covariance d'ensemble"
+ __Anomalies = EnsembleOfAnomalies( Ensemble )
+ __n, __m = numpy.asarray(__Anomalies).shape
+ # Estimation empirique
+ __Covariance = (__Anomalies @ __Anomalies.T) / (__m-1)
+ # Assure la symétrie
+ __Covariance = (__Covariance + __Covariance.T) * 0.5
+ # Assure la positivité
+ __epsilon = mpr*numpy.trace(__Covariance)
+ __Covariance = __Covariance + __epsilon * numpy.identity(__n)
+ #
+ return __Covariance
+
+# ==============================================================================
+def CovarianceInflation(
+ InputCovOrEns,
+ InflationType = None,
+ InflationFactor = None,
+ BackgroundCov = None,
+ ):
+ """
+ Inflation applicable soit sur Pb ou Pa, soit sur les ensembles EXb ou EXa
+
+ Synthèse : Hunt 2007, section 2.3.5
+ """
+ if InflationFactor is None:
+ return InputCovOrEns
+ else:
+ InflationFactor = float(InflationFactor)
+ #
+ if InflationType in ["MultiplicativeOnAnalysisCovariance", "MultiplicativeOnBackgroundCovariance"]:
+ if InflationFactor < 1.:
+ raise ValueError("Inflation factor for multiplicative inflation has to be greater or equal than 1.")
+ if InflationFactor < 1.+mpr:
+ return InputCovOrEns
+ OutputCovOrEns = InflationFactor**2 * InputCovOrEns
+ #
+ elif InflationType in ["MultiplicativeOnAnalysisAnomalies", "MultiplicativeOnBackgroundAnomalies"]:
+ if InflationFactor < 1.:
+ raise ValueError("Inflation factor for multiplicative inflation has to be greater or equal than 1.")
+ if InflationFactor < 1.+mpr:
+ return InputCovOrEns
+ InputCovOrEnsMean = InputCovOrEns.mean(axis=1, dtype=mfp).astype('float')
+ OutputCovOrEns = InputCovOrEnsMean[:,numpy.newaxis] \
+ + InflationFactor * (InputCovOrEns - InputCovOrEnsMean[:,numpy.newaxis])
+ #
+ elif InflationType in ["AdditiveOnAnalysisCovariance", "AdditiveOnBackgroundCovariance"]:
+ if InflationFactor < 0.:
+ raise ValueError("Inflation factor for additive inflation has to be greater or equal than 0.")
+ if InflationFactor < mpr:
+ return InputCovOrEns
+ __n, __m = numpy.asarray(InputCovOrEns).shape
+ if __n != __m:
+ raise ValueError("Additive inflation can only be applied to squared (covariance) matrix.")
+ OutputCovOrEns = (1. - InflationFactor) * InputCovOrEns + InflationFactor * numpy.identity(__n)
+ #
+ elif InflationType == "HybridOnBackgroundCovariance":
+ if InflationFactor < 0.:
+ raise ValueError("Inflation factor for hybrid inflation has to be greater or equal than 0.")
+ if InflationFactor < mpr:
+ return InputCovOrEns
+ __n, __m = numpy.asarray(InputCovOrEns).shape
+ if __n != __m:
+ raise ValueError("Additive inflation can only be applied to squared (covariance) matrix.")
+ if BackgroundCov is None:
+ raise ValueError("Background covariance matrix B has to be given for hybrid inflation.")
+ if InputCovOrEns.shape != BackgroundCov.shape:
+ raise ValueError("Ensemble covariance matrix has to be of same size than background covariance matrix B.")
+ OutputCovOrEns = (1. - InflationFactor) * InputCovOrEns + InflationFactor * BackgroundCov
+ #
+ elif InflationType == "Relaxation":
+ raise NotImplementedError("InflationType Relaxation")
+ #
+ else:
+ raise ValueError("Error in inflation type, '%s' is not a valid keyword."%InflationType)
+ #
+ return OutputCovOrEns
+
+# ==============================================================================
+def enks(selfA, Xb, Y, U, HO, EM, CM, R, B, Q, VariantM="EnKS16-KalmanFilterFormula"):
+ """
+ EnKS
+ """
+ #
+ # Initialisations
+ # ---------------
+ #
+ # Opérateurs
+ H = HO["Direct"].appliedControledFormTo
+ #
+ if selfA._parameters["EstimationOf"] == "State":
+ M = EM["Direct"].appliedControledFormTo
+ #
+ if CM is not None and "Tangent" in CM and U is not None:
+ Cm = CM["Tangent"].asMatrix(Xb)
+ else:
+ Cm = None
+ #
+ # Précalcul des inversions de B et R
+ RIdemi = R.sqrtmI()
+ #
+ LagL = selfA._parameters["SmootherLagL"]
+ if (not hasattr(Y,"store")) or (not hasattr(Y,"stepnumber")):
+ raise ValueError("Fixed-lag smoother requires a series of observation")
+ if Y.stepnumber() < LagL:
+ raise ValueError("Fixed-lag smoother requires a series of observation greater then the lag L")
+ duration = Y.stepnumber()
+ __p = numpy.cumprod(Y.shape())[-1]
+ __n = Xb.size
+ __m = selfA._parameters["NumberOfMembers"]
+ #
+ if hasattr(B,"asfullmatrix"): Pn = B.asfullmatrix(__n)
+ else: Pn = B
+ if hasattr(Q,"asfullmatrix"): Qn = Q.asfullmatrix(__n)
+ else: Qn = Q
+ if len(selfA.StoredVariables["Analysis"])==0 or not selfA._parameters["nextStep"]:
+ selfA.StoredVariables["Analysis"].store( Xb )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( Pn )
+ covarianceXa = Pn
+ #
+ # Calcul direct initial (on privilégie la mémorisation au recalcul)
+ __seed = numpy.random.get_state()
+ selfB = copy.deepcopy(selfA)
+ selfB._parameters["StoreSupplementaryCalculations"] = ["CurrentEnsembleState"]
+ if VariantM == "EnKS16-KalmanFilterFormula":
+ etkf(selfB, Xb, Y, U, HO, EM, CM, R, B, Q, VariantM = "KalmanFilterFormula")
+ else:
+ raise ValueError("VariantM has to be chosen in the authorized methods list.")
+ if LagL > 0:
+ EL = selfB.StoredVariables["CurrentEnsembleState"][LagL-1]
+ else:
+ EL = EnsembleOfBackgroundPerturbations( Xb, None, __m ) # Cf. etkf
+ selfA._parameters["SetSeed"] = numpy.random.set_state(__seed)
+ #
+ for step in range(LagL,duration-1):
+ #
+ sEL = selfB.StoredVariables["CurrentEnsembleState"][step+1-LagL:step+1]
+ sEL.append(None)
+ #
+ if hasattr(Y,"store"):
+ Ynpu = numpy.ravel( Y[step+1] ).reshape((__p,1))
+ else:
+ Ynpu = numpy.ravel( Y ).reshape((__p,1))
+ #
+ if U is not None:
+ if hasattr(U,"store") and len(U)>1:
+ Un = numpy.asmatrix(numpy.ravel( U[step] )).T
+ elif hasattr(U,"store") and len(U)==1:
+ Un = numpy.asmatrix(numpy.ravel( U[0] )).T
+ else:
+ Un = numpy.asmatrix(numpy.ravel( U )).T
+ else:
+ Un = None
+ #
+ #--------------------------
+ if VariantM == "EnKS16-KalmanFilterFormula":
+ if selfA._parameters["EstimationOf"] == "State": # Forecast
+ EL = M( [(EL[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ EL = EL + numpy.random.multivariate_normal(numpy.zeros(__n), Qn, size=__m).T
+ EZ = H( [(EL[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ if Cm is not None and Un is not None: # Attention : si Cm est aussi dans M, doublon !
+ Cm = Cm.reshape(__n,Un.size) # ADAO & check shape
+ EZ = EZ + Cm * Un
+ elif selfA._parameters["EstimationOf"] == "Parameters":
+ # --- > Par principe, M = Id, Q = 0
+ EZ = H( [(EL[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ #
+ vEm = EL.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ vZm = EZ.mean(axis=1, dtype=mfp).astype('float').reshape((__p,1))
+ #
+ mS = RIdemi @ EnsembleOfAnomalies( EZ, vZm, 1./math.sqrt(__m-1) )
+ delta = RIdemi @ ( Ynpu - vZm )
+ mT = numpy.linalg.inv( numpy.identity(__m) + mS.T @ mS )
+ vw = mT @ mS.T @ delta
+ #
+ Tdemi = numpy.real(scipy.linalg.sqrtm(mT))
+ mU = numpy.identity(__m)
+ wTU = (vw.reshape((__m,1)) + math.sqrt(__m-1) * Tdemi @ mU)
+ #
+ EX = EnsembleOfAnomalies( EL, vEm, 1./math.sqrt(__m-1) )
+ EL = vEm + EX @ wTU
+ #
+ sEL[LagL] = EL
+ for irl in range(LagL): # Lissage des L précédentes analysis
+ vEm = sEL[irl].mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ EX = EnsembleOfAnomalies( sEL[irl], vEm, 1./math.sqrt(__m-1) )
+ sEL[irl] = vEm + EX @ wTU
+ #
+ # Conservation de l'analyse retrospective d'ordre 0 avant rotation
+ Xa = sEL[0].mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ if selfA._toStore("APosterioriCovariance"):
+ EXn = sEL[0]
+ #
+ for irl in range(LagL):
+ sEL[irl] = sEL[irl+1]
+ sEL[LagL] = None
+ #--------------------------
+ else:
+ raise ValueError("VariantM has to be chosen in the authorized methods list.")
+ #
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ selfA.StoredVariables["Analysis"].store( Xa )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( EnsembleErrorCovariance(EXn) )
+ #
+ # Stockage des dernières analyses incomplètement remises à jour
+ for irl in range(LagL):
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ Xa = sEL[irl].mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ selfA.StoredVariables["Analysis"].store( Xa )
+ #
+ return 0
+
+# ==============================================================================
+def etkf(selfA, Xb, Y, U, HO, EM, CM, R, B, Q, VariantM="KalmanFilterFormula"):
+ """
+ Ensemble-Transform EnKF
+ """
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA._parameters["StoreInternalVariables"] = True
+ #
+ # Opérateurs
+ # ----------
+ H = HO["Direct"].appliedControledFormTo
+ #
+ if selfA._parameters["EstimationOf"] == "State":
+ M = EM["Direct"].appliedControledFormTo
+ #
+ if CM is not None and "Tangent" in CM and U is not None:
+ Cm = CM["Tangent"].asMatrix(Xb)
+ else:
+ Cm = None
+ #
+ # Nombre de pas identique au nombre de pas d'observations
+ # -------------------------------------------------------
+ if hasattr(Y,"stepnumber"):
+ duration = Y.stepnumber()
+ __p = numpy.cumprod(Y.shape())[-1]
+ else:
+ duration = 2
+ __p = numpy.array(Y).size
+ #
+ # Précalcul des inversions de B et R
+ # ----------------------------------
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ BI = B.getI()
+ RI = R.getI()
+ elif VariantM != "KalmanFilterFormula":
+ RI = R.getI()
+ if VariantM == "KalmanFilterFormula":
+ RIdemi = R.sqrtmI()
+ #
+ # Initialisation
+ # --------------
+ __n = Xb.size
+ __m = selfA._parameters["NumberOfMembers"]
+ if hasattr(B,"asfullmatrix"): Pn = B.asfullmatrix(__n)
+ else: Pn = B
+ if hasattr(Q,"asfullmatrix"): Qn = Q.asfullmatrix(__n)
+ else: Qn = Q
+ Xn = EnsembleOfBackgroundPerturbations( Xb, None, __m )
+ #~ Xn = EnsembleOfBackgroundPerturbations( Xb, Pn, __m )
+ #
+ if len(selfA.StoredVariables["Analysis"])==0 or not selfA._parameters["nextStep"]:
+ selfA.StoredVariables["Analysis"].store( Xb )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( Pn )
+ covarianceXa = Pn
+ #
+ previousJMinimum = numpy.finfo(float).max
+ #
+ for step in range(duration-1):
+ if hasattr(Y,"store"):
+ Ynpu = numpy.ravel( Y[step+1] ).reshape((__p,1))
+ else:
+ Ynpu = numpy.ravel( Y ).reshape((__p,1))
+ #
+ if U is not None:
+ if hasattr(U,"store") and len(U)>1:
+ Un = numpy.asmatrix(numpy.ravel( U[step] )).T
+ elif hasattr(U,"store") and len(U)==1:
+ Un = numpy.asmatrix(numpy.ravel( U[0] )).T
+ else:
+ Un = numpy.asmatrix(numpy.ravel( U )).T
+ else:
+ Un = None
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnBackgroundAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ if selfA._parameters["EstimationOf"] == "State": # Forecast + Q and observation of forecast
+ EMX = M( [(Xn[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ qi = numpy.random.multivariate_normal(numpy.zeros(__n), Qn, size=__m).T
+ Xn_predicted = EMX + qi
+ HX_predicted = H( [(Xn_predicted[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ if Cm is not None and Un is not None: # Attention : si Cm est aussi dans M, doublon !
+ Cm = Cm.reshape(__n,Un.size) # ADAO & check shape
+ Xn_predicted = Xn_predicted + Cm * Un
+ elif selfA._parameters["EstimationOf"] == "Parameters": # Observation of forecast
+ # --- > Par principe, M = Id, Q = 0
+ Xn_predicted = Xn
+ HX_predicted = H( [(Xn_predicted[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ #
+ # Mean of forecast and observation of forecast
+ Xfm = Xn_predicted.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ Hfm = HX_predicted.mean(axis=1, dtype=mfp).astype('float').reshape((__p,1))
+ #
+ # Anomalies
+ EaX = EnsembleOfAnomalies( Xn_predicted, Xfm )
+ EaHX = EnsembleOfAnomalies( HX_predicted, Hfm)
+ #
+ #--------------------------
+ if VariantM == "KalmanFilterFormula":
+ mS = RIdemi * EaHX / math.sqrt(__m-1)
+ delta = RIdemi * ( Ynpu - Hfm )
+ mT = numpy.linalg.inv( numpy.identity(__m) + mS.T @ mS )
+ vw = mT @ mS.T @ delta
+ #
+ Tdemi = numpy.real(scipy.linalg.sqrtm(mT))
+ mU = numpy.identity(__m)
+ #
+ EaX = EaX / math.sqrt(__m-1)
+ Xn = Xfm + EaX @ ( vw.reshape((__m,1)) + math.sqrt(__m-1) * Tdemi @ mU )
+ #--------------------------
+ elif VariantM == "Variational":
+ HXfm = H((Xfm[:,None], Un)) # Eventuellement Hfm
+ def CostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _Jo = 0.5 * _A.T @ (RI * _A)
+ _Jb = 0.5 * (__m-1) * w.T @ w
+ _J = _Jo + _Jb
+ return float(_J)
+ def GradientOfCostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _GardJo = - EaHX.T @ (RI * _A)
+ _GradJb = (__m-1) * w.reshape((__m,1))
+ _GradJ = _GardJo + _GradJb
+ return numpy.ravel(_GradJ)
+ vw = scipy.optimize.fmin_cg(
+ f = CostFunction,
+ x0 = numpy.zeros(__m),
+ fprime = GradientOfCostFunction,
+ args = (),
+ disp = False,
+ )
+ #
+ Hto = EaHX.T @ (RI * EaHX)
+ Htb = (__m-1) * numpy.identity(__m)
+ Hta = Hto + Htb
+ #
+ Pta = numpy.linalg.inv( Hta )
+ EWa = numpy.real(scipy.linalg.sqrtm((__m-1)*Pta)) # Partie imaginaire ~= 10^-18
+ #
+ Xn = Xfm + EaX @ (vw[:,None] + EWa)
+ #--------------------------
+ elif VariantM == "FiniteSize11": # Jauge Boc2011
+ HXfm = H((Xfm[:,None], Un)) # Eventuellement Hfm
+ def CostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _Jo = 0.5 * _A.T @ (RI * _A)
+ _Jb = 0.5 * __m * math.log(1 + 1/__m + w.T @ w)
+ _J = _Jo + _Jb
+ return float(_J)
+ def GradientOfCostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _GardJo = - EaHX.T @ (RI * _A)
+ _GradJb = __m * w.reshape((__m,1)) / (1 + 1/__m + w.T @ w)
+ _GradJ = _GardJo + _GradJb
+ return numpy.ravel(_GradJ)
+ vw = scipy.optimize.fmin_cg(
+ f = CostFunction,
+ x0 = numpy.zeros(__m),
+ fprime = GradientOfCostFunction,
+ args = (),
+ disp = False,
+ )
+ #
+ Hto = EaHX.T @ (RI * EaHX)
+ Htb = __m * \
+ ( (1 + 1/__m + vw.T @ vw) * numpy.identity(__m) - 2 * vw @ vw.T ) \
+ / (1 + 1/__m + vw.T @ vw)**2
+ Hta = Hto + Htb
+ #
+ Pta = numpy.linalg.inv( Hta )
+ EWa = numpy.real(scipy.linalg.sqrtm((__m-1)*Pta)) # Partie imaginaire ~= 10^-18
+ #
+ Xn = Xfm + EaX @ (vw.reshape((__m,1)) + EWa)
+ #--------------------------
+ elif VariantM == "FiniteSize15": # Jauge Boc2015
+ HXfm = H((Xfm[:,None], Un)) # Eventuellement Hfm
+ def CostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _Jo = 0.5 * _A.T * RI * _A
+ _Jb = 0.5 * (__m+1) * math.log(1 + 1/__m + w.T @ w)
+ _J = _Jo + _Jb
+ return float(_J)
+ def GradientOfCostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _GardJo = - EaHX.T @ (RI * _A)
+ _GradJb = (__m+1) * w.reshape((__m,1)) / (1 + 1/__m + w.T @ w)
+ _GradJ = _GardJo + _GradJb
+ return numpy.ravel(_GradJ)
+ vw = scipy.optimize.fmin_cg(
+ f = CostFunction,
+ x0 = numpy.zeros(__m),
+ fprime = GradientOfCostFunction,
+ args = (),
+ disp = False,
+ )
+ #
+ Hto = EaHX.T @ (RI * EaHX)
+ Htb = (__m+1) * \
+ ( (1 + 1/__m + vw.T @ vw) * numpy.identity(__m) - 2 * vw @ vw.T ) \
+ / (1 + 1/__m + vw.T @ vw)**2
+ Hta = Hto + Htb
+ #
+ Pta = numpy.linalg.inv( Hta )
+ EWa = numpy.real(scipy.linalg.sqrtm((__m-1)*Pta)) # Partie imaginaire ~= 10^-18
+ #
+ Xn = Xfm + EaX @ (vw.reshape((__m,1)) + EWa)
+ #--------------------------
+ elif VariantM == "FiniteSize16": # Jauge Boc2016
+ HXfm = H((Xfm[:,None], Un)) # Eventuellement Hfm
+ def CostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _Jo = 0.5 * _A.T @ (RI * _A)
+ _Jb = 0.5 * (__m+1) * math.log(1 + 1/__m + w.T @ w / (__m-1))
+ _J = _Jo + _Jb
+ return float(_J)
+ def GradientOfCostFunction(w):
+ _A = Ynpu - HXfm.reshape((__p,1)) - (EaHX @ w).reshape((__p,1))
+ _GardJo = - EaHX.T @ (RI * _A)
+ _GradJb = ((__m+1) / (__m-1)) * w.reshape((__m,1)) / (1 + 1/__m + w.T @ w / (__m-1))
+ _GradJ = _GardJo + _GradJb
+ return numpy.ravel(_GradJ)
+ vw = scipy.optimize.fmin_cg(
+ f = CostFunction,
+ x0 = numpy.zeros(__m),
+ fprime = GradientOfCostFunction,
+ args = (),
+ disp = False,
+ )
+ #
+ Hto = EaHX.T @ (RI * EaHX)
+ Htb = ((__m+1) / (__m-1)) * \
+ ( (1 + 1/__m + vw.T @ vw / (__m-1)) * numpy.identity(__m) - 2 * vw @ vw.T / (__m-1) ) \
+ / (1 + 1/__m + vw.T @ vw / (__m-1))**2
+ Hta = Hto + Htb
+ #
+ Pta = numpy.linalg.inv( Hta )
+ EWa = numpy.real(scipy.linalg.sqrtm((__m-1)*Pta)) # Partie imaginaire ~= 10^-18
+ #
+ Xn = Xfm + EaX @ (vw[:,None] + EWa)
+ #--------------------------
+ else:
+ raise ValueError("VariantM has to be chosen in the authorized methods list.")
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnAnalysisAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ Xa = Xn.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ #--------------------------
+ #
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("APosterioriCovariance") \
+ or selfA._toStore("InnovationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ _HXa = numpy.asmatrix(numpy.ravel( H((Xa, Un)) )).T
+ _Innovation = Ynpu - _HXa
+ #
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ # ---> avec analysis
+ selfA.StoredVariables["Analysis"].store( Xa )
+ if selfA._toStore("SimulatedObservationAtCurrentAnalysis"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"].store( _HXa )
+ if selfA._toStore("InnovationAtCurrentAnalysis"):
+ selfA.StoredVariables["InnovationAtCurrentAnalysis"].store( _Innovation )
+ # ---> avec current state
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CurrentState"):
+ selfA.StoredVariables["CurrentState"].store( Xn )
+ if selfA._toStore("ForecastState"):
+ selfA.StoredVariables["ForecastState"].store( EMX )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( EMX - Xa.reshape((__n,1)) )
+ if selfA._toStore("InnovationAtCurrentState"):
+ selfA.StoredVariables["InnovationAtCurrentState"].store( - HX_predicted + Ynpu )
+ if selfA._toStore("SimulatedObservationAtCurrentState") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentState"].store( HX_predicted )
+ # ---> autres
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ Jb = float( 0.5 * (Xa - Xb).T * BI * (Xa - Xb) )
+ Jo = float( 0.5 * _Innovation.T * RI * _Innovation )
+ J = Jb + Jo
+ selfA.StoredVariables["CostFunctionJb"].store( Jb )
+ selfA.StoredVariables["CostFunctionJo"].store( Jo )
+ selfA.StoredVariables["CostFunctionJ" ].store( J )
+ #
+ if selfA._toStore("IndexOfOptimum") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("CostFunctionJAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJbAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJoAtCurrentOptimum") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ IndexMin = numpy.argmin( selfA.StoredVariables["CostFunctionJ"][nbPreviousSteps:] ) + nbPreviousSteps
+ if selfA._toStore("IndexOfOptimum"):
+ selfA.StoredVariables["IndexOfOptimum"].store( IndexMin )
+ if selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentOptimum"].store( selfA.StoredVariables["Analysis"][IndexMin] )
+ if selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentOptimum"].store( selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"][IndexMin] )
+ if selfA._toStore("CostFunctionJbAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJbAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJb"][IndexMin] )
+ if selfA._toStore("CostFunctionJoAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJoAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJo"][IndexMin] )
+ if selfA._toStore("CostFunctionJAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJAtCurrentOptimum" ].store( selfA.StoredVariables["CostFunctionJ" ][IndexMin] )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( EnsembleErrorCovariance(Xn) )
+ if selfA._parameters["EstimationOf"] == "Parameters" \
+ and J < previousJMinimum:
+ previousJMinimum = J
+ XaMin = Xa
+ if selfA._toStore("APosterioriCovariance"):
+ covarianceXaMin = Pn
+ # ---> Pour les smoothers
+ if selfA._toStore("CurrentEnsembleState"):
+ selfA.StoredVariables["CurrentEnsembleState"].store( Xn )
+ #
+ # Stockage final supplémentaire de l'optimum en estimation de paramètres
+ # ----------------------------------------------------------------------
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ selfA.StoredVariables["Analysis"].store( XaMin )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( covarianceXaMin )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( numpy.ravel(Xb) - numpy.ravel(XaMin) )
+ #
+ return 0
+
+# ==============================================================================
+def ienkf(selfA, Xb, Y, U, HO, EM, CM, R, B, Q, VariantM="IEnKF12",
+ BnotT=False, _epsilon=1.e-3, _e=1.e-7, _jmax=15000):
+ """
+ Iterative EnKF
+ """
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA._parameters["StoreInternalVariables"] = True
+ #
+ # Opérateurs
+ # ----------
+ H = HO["Direct"].appliedControledFormTo
+ #
+ if selfA._parameters["EstimationOf"] == "State":
+ M = EM["Direct"].appliedControledFormTo
+ #
+ if CM is not None and "Tangent" in CM and U is not None:
+ Cm = CM["Tangent"].asMatrix(Xb)
+ else:
+ Cm = None
+ #
+ # Nombre de pas identique au nombre de pas d'observations
+ # -------------------------------------------------------
+ if hasattr(Y,"stepnumber"):
+ duration = Y.stepnumber()
+ __p = numpy.cumprod(Y.shape())[-1]
+ else:
+ duration = 2
+ __p = numpy.array(Y).size
+ #
+ # Précalcul des inversions de B et R
+ # ----------------------------------
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ BI = B.getI()
+ RI = R.getI()
+ #
+ # Initialisation
+ # --------------
+ __n = Xb.size
+ __m = selfA._parameters["NumberOfMembers"]
+ if hasattr(B,"asfullmatrix"): Pn = B.asfullmatrix(__n)
+ else: Pn = B
+ if hasattr(R,"asfullmatrix"): Rn = R.asfullmatrix(__p)
+ else: Rn = R
+ if hasattr(Q,"asfullmatrix"): Qn = Q.asfullmatrix(__n)
+ else: Qn = Q
+ Xn = EnsembleOfBackgroundPerturbations( Xb, Pn, __m )
+ #
+ if len(selfA.StoredVariables["Analysis"])==0 or not selfA._parameters["nextStep"]:
+ selfA.StoredVariables["Analysis"].store( Xb )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( Pn )
+ covarianceXa = Pn
+ #
+ previousJMinimum = numpy.finfo(float).max
+ #
+ for step in range(duration-1):
+ if hasattr(Y,"store"):
+ Ynpu = numpy.ravel( Y[step+1] ).reshape((__p,1))
+ else:
+ Ynpu = numpy.ravel( Y ).reshape((__p,1))
+ #
+ if U is not None:
+ if hasattr(U,"store") and len(U)>1:
+ Un = numpy.asmatrix(numpy.ravel( U[step] )).T
+ elif hasattr(U,"store") and len(U)==1:
+ Un = numpy.asmatrix(numpy.ravel( U[0] )).T
+ else:
+ Un = numpy.asmatrix(numpy.ravel( U )).T
+ else:
+ Un = None
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnBackgroundAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ #--------------------------
+ if VariantM == "IEnKF12":
+ Xfm = numpy.ravel(Xn.mean(axis=1, dtype=mfp).astype('float'))
+ EaX = EnsembleOfAnomalies( Xn ) / math.sqrt(__m-1)
+ __j = 0
+ Deltaw = 1
+ if not BnotT:
+ Ta = numpy.identity(__m)
+ vw = numpy.zeros(__m)
+ while numpy.linalg.norm(Deltaw) >= _e and __j <= _jmax:
+ vx1 = (Xfm + EaX @ vw).reshape((__n,1))
+ #
+ if BnotT:
+ E1 = vx1 + _epsilon * EaX
+ else:
+ E1 = vx1 + math.sqrt(__m-1) * EaX @ Ta
+ #
+ if selfA._parameters["EstimationOf"] == "State": # Forecast + Q
+ E2 = M( [(E1[:,i,numpy.newaxis], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ elif selfA._parameters["EstimationOf"] == "Parameters":
+ # --- > Par principe, M = Id
+ E2 = Xn
+ vx2 = E2.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ vy1 = H((vx2, Un)).reshape((__p,1))
+ #
+ HE2 = H( [(E2[:,i,numpy.newaxis], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ vy2 = HE2.mean(axis=1, dtype=mfp).astype('float').reshape((__p,1))
+ #
+ if BnotT:
+ EaY = (HE2 - vy2) / _epsilon
+ else:
+ EaY = ( (HE2 - vy2) @ numpy.linalg.inv(Ta) ) / math.sqrt(__m-1)
+ #
+ GradJ = numpy.ravel(vw[:,None] - EaY.transpose() @ (RI * ( Ynpu - vy1 )))
+ mH = numpy.identity(__m) + EaY.transpose() @ (RI * EaY)
+ Deltaw = - numpy.linalg.solve(mH,GradJ)
+ #
+ vw = vw + Deltaw
+ #
+ if not BnotT:
+ Ta = numpy.real(scipy.linalg.sqrtm(numpy.linalg.inv( mH )))
+ #
+ __j = __j + 1
+ #
+ A2 = EnsembleOfAnomalies( E2 )
+ #
+ if BnotT:
+ Ta = numpy.real(scipy.linalg.sqrtm(numpy.linalg.inv( mH )))
+ A2 = math.sqrt(__m-1) * A2 @ Ta / _epsilon
+ #
+ Xn = vx2 + A2
+ #--------------------------
+ else:
+ raise ValueError("VariantM has to be chosen in the authorized methods list.")
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnAnalysisAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ Xa = Xn.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ #--------------------------
+ #
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("APosterioriCovariance") \
+ or selfA._toStore("InnovationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ _HXa = numpy.asmatrix(numpy.ravel( H((Xa, Un)) )).T
+ _Innovation = Ynpu - _HXa
+ #
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ # ---> avec analysis
+ selfA.StoredVariables["Analysis"].store( Xa )
+ if selfA._toStore("SimulatedObservationAtCurrentAnalysis"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"].store( _HXa )
+ if selfA._toStore("InnovationAtCurrentAnalysis"):
+ selfA.StoredVariables["InnovationAtCurrentAnalysis"].store( _Innovation )
+ # ---> avec current state
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CurrentState"):
+ selfA.StoredVariables["CurrentState"].store( Xn )
+ if selfA._toStore("ForecastState"):
+ selfA.StoredVariables["ForecastState"].store( E2 )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( E2 - Xa )
+ if selfA._toStore("InnovationAtCurrentState"):
+ selfA.StoredVariables["InnovationAtCurrentState"].store( - HE2 + Ynpu )
+ if selfA._toStore("SimulatedObservationAtCurrentState") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentState"].store( HE2 )
+ # ---> autres
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ Jb = float( 0.5 * (Xa - Xb).T * BI * (Xa - Xb) )
+ Jo = float( 0.5 * _Innovation.T * RI * _Innovation )
+ J = Jb + Jo
+ selfA.StoredVariables["CostFunctionJb"].store( Jb )
+ selfA.StoredVariables["CostFunctionJo"].store( Jo )
+ selfA.StoredVariables["CostFunctionJ" ].store( J )
+ #
+ if selfA._toStore("IndexOfOptimum") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("CostFunctionJAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJbAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJoAtCurrentOptimum") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ IndexMin = numpy.argmin( selfA.StoredVariables["CostFunctionJ"][nbPreviousSteps:] ) + nbPreviousSteps
+ if selfA._toStore("IndexOfOptimum"):
+ selfA.StoredVariables["IndexOfOptimum"].store( IndexMin )
+ if selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentOptimum"].store( selfA.StoredVariables["Analysis"][IndexMin] )
+ if selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentOptimum"].store( selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"][IndexMin] )
+ if selfA._toStore("CostFunctionJbAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJbAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJb"][IndexMin] )
+ if selfA._toStore("CostFunctionJoAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJoAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJo"][IndexMin] )
+ if selfA._toStore("CostFunctionJAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJAtCurrentOptimum" ].store( selfA.StoredVariables["CostFunctionJ" ][IndexMin] )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( EnsembleErrorCovariance(Xn) )
+ if selfA._parameters["EstimationOf"] == "Parameters" \
+ and J < previousJMinimum:
+ previousJMinimum = J
+ XaMin = Xa
+ if selfA._toStore("APosterioriCovariance"):
+ covarianceXaMin = Pn
+ #
+ # Stockage final supplémentaire de l'optimum en estimation de paramètres
+ # ----------------------------------------------------------------------
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ selfA.StoredVariables["Analysis"].store( XaMin )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( covarianceXaMin )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( numpy.ravel(Xb) - numpy.ravel(XaMin) )
+ #
+ return 0
+
+# ==============================================================================
+def incr3dvar(selfA, Xb, Y, U, HO, EM, CM, R, B, Q):
+ """
+ 3DVAR incrémental
+ """
+ #
+ # Initialisations
+ # ---------------
+ #
+ # Opérateur non-linéaire pour la boucle externe
+ Hm = HO["Direct"].appliedTo
+ #
+ # Précalcul des inversions de B et R
+ BI = B.getI()
+ RI = R.getI()
+ #
+ # Point de démarrage de l'optimisation
+ Xini = selfA._parameters["InitializationPoint"]
+ #
+ HXb = numpy.asmatrix(numpy.ravel( Hm( Xb ) )).T
+ Innovation = Y - HXb
+ #
+ # Outer Loop
+ # ----------
+ iOuter = 0
+ J = 1./mpr
+ DeltaJ = 1./mpr
+ Xr = Xini.reshape((-1,1))
+ while abs(DeltaJ) >= selfA._parameters["CostDecrementTolerance"] and iOuter <= selfA._parameters["MaximumNumberOfSteps"]:
+ #
+ # Inner Loop
+ # ----------
+ Ht = HO["Tangent"].asMatrix(Xr)
+ Ht = Ht.reshape(Y.size,Xr.size) # ADAO & check shape
+ #
+ # Définition de la fonction-coût
+ # ------------------------------
+ def CostFunction(dx):
+ _dX = numpy.asmatrix(numpy.ravel( dx )).T
+ if selfA._parameters["StoreInternalVariables"] or \
+ selfA._toStore("CurrentState") or \
+ selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentState"].store( Xb + _dX )
+ _HdX = Ht * _dX
+ _HdX = numpy.asmatrix(numpy.ravel( _HdX )).T
+ _dInnovation = Innovation - _HdX
+ if selfA._toStore("SimulatedObservationAtCurrentState") or \
+ selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentState"].store( HXb + _HdX )
+ if selfA._toStore("InnovationAtCurrentState"):
+ selfA.StoredVariables["InnovationAtCurrentState"].store( _dInnovation )
+ #
+ Jb = float( 0.5 * _dX.T * BI * _dX )
+ Jo = float( 0.5 * _dInnovation.T * RI * _dInnovation )
+ J = Jb + Jo
+ #
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["CostFunctionJ"]) )
+ selfA.StoredVariables["CostFunctionJb"].store( Jb )
+ selfA.StoredVariables["CostFunctionJo"].store( Jo )
+ selfA.StoredVariables["CostFunctionJ" ].store( J )
+ if selfA._toStore("IndexOfOptimum") or \
+ selfA._toStore("CurrentOptimum") or \
+ selfA._toStore("CostFunctionJAtCurrentOptimum") or \
+ selfA._toStore("CostFunctionJbAtCurrentOptimum") or \
+ selfA._toStore("CostFunctionJoAtCurrentOptimum") or \
+ selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ IndexMin = numpy.argmin( selfA.StoredVariables["CostFunctionJ"][nbPreviousSteps:] ) + nbPreviousSteps
+ if selfA._toStore("IndexOfOptimum"):
+ selfA.StoredVariables["IndexOfOptimum"].store( IndexMin )
+ if selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentOptimum"].store( selfA.StoredVariables["CurrentState"][IndexMin] )
+ if selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentOptimum"].store( selfA.StoredVariables["SimulatedObservationAtCurrentState"][IndexMin] )
+ if selfA._toStore("CostFunctionJbAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJbAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJb"][IndexMin] )
+ if selfA._toStore("CostFunctionJoAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJoAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJo"][IndexMin] )
+ if selfA._toStore("CostFunctionJAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJAtCurrentOptimum" ].store( selfA.StoredVariables["CostFunctionJ" ][IndexMin] )
+ return J
+ #
+ def GradientOfCostFunction(dx):
+ _dX = numpy.asmatrix(numpy.ravel( dx )).T
+ _HdX = Ht * _dX
+ _HdX = numpy.asmatrix(numpy.ravel( _HdX )).T
+ _dInnovation = Innovation - _HdX
+ GradJb = BI * _dX
+ GradJo = - Ht.T @ (RI * _dInnovation)
+ GradJ = numpy.ravel( GradJb ) + numpy.ravel( GradJo )
+ return GradJ
+ #
+ # Minimisation de la fonctionnelle
+ # --------------------------------
+ nbPreviousSteps = selfA.StoredVariables["CostFunctionJ"].stepnumber()
+ #
+ if selfA._parameters["Minimizer"] == "LBFGSB":
+ # Minimum, J_optimal, Informations = scipy.optimize.fmin_l_bfgs_b(
+ if "0.19" <= scipy.version.version <= "1.1.0":
+ import lbfgsbhlt as optimiseur
+ else:
+ import scipy.optimize as optimiseur
+ Minimum, J_optimal, Informations = optimiseur.fmin_l_bfgs_b(
+ func = CostFunction,
+ x0 = numpy.zeros(Xini.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ bounds = selfA._parameters["Bounds"],
+ maxfun = selfA._parameters["MaximumNumberOfSteps"]-1,
+ factr = selfA._parameters["CostDecrementTolerance"]*1.e14,
+ pgtol = selfA._parameters["ProjectedGradientTolerance"],
+ iprint = selfA._parameters["optiprint"],
+ )
+ nfeval = Informations['funcalls']
+ rc = Informations['warnflag']
+ elif selfA._parameters["Minimizer"] == "TNC":
+ Minimum, nfeval, rc = scipy.optimize.fmin_tnc(
+ func = CostFunction,
+ x0 = numpy.zeros(Xini.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ bounds = selfA._parameters["Bounds"],
+ maxfun = selfA._parameters["MaximumNumberOfSteps"],
+ pgtol = selfA._parameters["ProjectedGradientTolerance"],
+ ftol = selfA._parameters["CostDecrementTolerance"],
+ messages = selfA._parameters["optmessages"],
+ )
+ elif selfA._parameters["Minimizer"] == "CG":
+ Minimum, fopt, nfeval, grad_calls, rc = scipy.optimize.fmin_cg(
+ f = CostFunction,
+ x0 = numpy.zeros(Xini.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ maxiter = selfA._parameters["MaximumNumberOfSteps"],
+ gtol = selfA._parameters["GradientNormTolerance"],
+ disp = selfA._parameters["optdisp"],
+ full_output = True,
+ )
+ elif selfA._parameters["Minimizer"] == "NCG":
+ Minimum, fopt, nfeval, grad_calls, hcalls, rc = scipy.optimize.fmin_ncg(
+ f = CostFunction,
+ x0 = numpy.zeros(Xini.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ maxiter = selfA._parameters["MaximumNumberOfSteps"],
+ avextol = selfA._parameters["CostDecrementTolerance"],
+ disp = selfA._parameters["optdisp"],
+ full_output = True,
+ )
+ elif selfA._parameters["Minimizer"] == "BFGS":
+ Minimum, fopt, gopt, Hopt, nfeval, grad_calls, rc = scipy.optimize.fmin_bfgs(
+ f = CostFunction,
+ x0 = numpy.zeros(Xini.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ maxiter = selfA._parameters["MaximumNumberOfSteps"],
+ gtol = selfA._parameters["GradientNormTolerance"],
+ disp = selfA._parameters["optdisp"],
+ full_output = True,
+ )
+ else:
+ raise ValueError("Error in Minimizer name: %s"%selfA._parameters["Minimizer"])
+ #
+ IndexMin = numpy.argmin( selfA.StoredVariables["CostFunctionJ"][nbPreviousSteps:] ) + nbPreviousSteps
+ MinJ = selfA.StoredVariables["CostFunctionJ"][IndexMin]
+ #
+ if selfA._parameters["StoreInternalVariables"] or selfA._toStore("CurrentState"):
+ Minimum = selfA.StoredVariables["CurrentState"][IndexMin]
+ Minimum = numpy.asmatrix(numpy.ravel( Minimum )).T
+ else:
+ Minimum = Xb + numpy.asmatrix(numpy.ravel( Minimum )).T
+ #
+ Xr = Minimum
+ DeltaJ = selfA.StoredVariables["CostFunctionJ" ][-1] - J
+ iOuter = selfA.StoredVariables["CurrentIterationNumber"][-1]
+ #
+ # Obtention de l'analyse
+ # ----------------------
+ Xa = Xr
+ #
+ selfA.StoredVariables["Analysis"].store( Xa )
+ #
+ if selfA._toStore("OMA") or \
+ selfA._toStore("SigmaObs2") or \
+ selfA._toStore("SimulationQuantiles") or \
+ selfA._toStore("SimulatedObservationAtOptimum"):
+ if selfA._toStore("SimulatedObservationAtCurrentState"):
+ HXa = selfA.StoredVariables["SimulatedObservationAtCurrentState"][IndexMin]
+ elif selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ HXa = selfA.StoredVariables["SimulatedObservationAtCurrentOptimum"][-1]
+ else:
+ HXa = Hm( Xa )
+ #
+ # Calcul de la covariance d'analyse
+ # ---------------------------------
+ if selfA._toStore("APosterioriCovariance") or \
+ selfA._toStore("SimulationQuantiles") or \
+ selfA._toStore("JacobianMatrixAtOptimum") or \
+ selfA._toStore("KalmanGainAtOptimum"):
+ HtM = HO["Tangent"].asMatrix(ValueForMethodForm = Xa)
+ HtM = HtM.reshape(Y.size,Xa.size) # ADAO & check shape
+ if selfA._toStore("APosterioriCovariance") or \
+ selfA._toStore("SimulationQuantiles") or \
+ selfA._toStore("KalmanGainAtOptimum"):
+ HaM = HO["Adjoint"].asMatrix(ValueForMethodForm = Xa)
+ HaM = HaM.reshape(Xa.size,Y.size) # ADAO & check shape
+ if selfA._toStore("APosterioriCovariance") or \
+ selfA._toStore("SimulationQuantiles"):
+ HessienneI = []
+ nb = Xa.size
+ for i in range(nb):
+ _ee = numpy.matrix(numpy.zeros(nb)).T
+ _ee[i] = 1.
+ _HtEE = numpy.dot(HtM,_ee)
+ _HtEE = numpy.asmatrix(numpy.ravel( _HtEE )).T
+ HessienneI.append( numpy.ravel( BI*_ee + HaM * (RI * _HtEE) ) )
+ HessienneI = numpy.matrix( HessienneI )
+ A = HessienneI.I
+ if min(A.shape) != max(A.shape):
+ raise ValueError("The %s a posteriori covariance matrix A is of shape %s, despites it has to be a squared matrix. There is an error in the observation operator, please check it."%(selfA._name,str(A.shape)))
+ if (numpy.diag(A) < 0).any():
+ raise ValueError("The %s a posteriori covariance matrix A has at least one negative value on its diagonal. There is an error in the observation operator, please check it."%(selfA._name,))
+ if logging.getLogger().level < logging.WARNING: # La verification n'a lieu qu'en debug
+ try:
+ L = numpy.linalg.cholesky( A )
+ except:
+ raise ValueError("The %s a posteriori covariance matrix A is not symmetric positive-definite. Please check your a priori covariances and your observation operator."%(selfA._name,))
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( A )
+ if selfA._toStore("JacobianMatrixAtOptimum"):
+ selfA.StoredVariables["JacobianMatrixAtOptimum"].store( HtM )
+ if selfA._toStore("KalmanGainAtOptimum"):
+ if (Y.size <= Xb.size): KG = B * HaM * (R + numpy.dot(HtM, B * HaM)).I
+ elif (Y.size > Xb.size): KG = (BI + numpy.dot(HaM, RI * HtM)).I * HaM * RI
+ selfA.StoredVariables["KalmanGainAtOptimum"].store( KG )
+ #
+ # Calculs et/ou stockages supplémentaires
+ # ---------------------------------------
+ if selfA._toStore("Innovation") or \
+ selfA._toStore("SigmaObs2") or \
+ selfA._toStore("MahalanobisConsistency") or \
+ selfA._toStore("OMB"):
+ d = Y - HXb
+ if selfA._toStore("Innovation"):
+ selfA.StoredVariables["Innovation"].store( numpy.ravel(d) )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( numpy.ravel(Xb) - numpy.ravel(Xa) )
+ if selfA._toStore("OMA"):
+ selfA.StoredVariables["OMA"].store( numpy.ravel(Y) - numpy.ravel(HXa) )
+ if selfA._toStore("OMB"):
+ selfA.StoredVariables["OMB"].store( numpy.ravel(d) )
+ if selfA._toStore("SigmaObs2"):
+ TraceR = R.trace(Y.size)
+ selfA.StoredVariables["SigmaObs2"].store( float( (d.T * (numpy.asmatrix(numpy.ravel(Y)).T-numpy.asmatrix(numpy.ravel(HXa)).T)) ) / TraceR )
+ if selfA._toStore("MahalanobisConsistency"):
+ selfA.StoredVariables["MahalanobisConsistency"].store( float( 2.*MinJ/d.size ) )
+ if selfA._toStore("SimulationQuantiles"):
+ nech = selfA._parameters["NumberOfSamplesForQuantiles"]
+ HXa = numpy.matrix(numpy.ravel( HXa )).T
+ YfQ = None
+ for i in range(nech):
+ if selfA._parameters["SimulationForQuantiles"] == "Linear":
+ dXr = numpy.matrix(numpy.random.multivariate_normal(Xa.A1,A) - Xa.A1).T
+ dYr = numpy.matrix(numpy.ravel( HtM * dXr )).T
+ Yr = HXa + dYr
+ elif selfA._parameters["SimulationForQuantiles"] == "NonLinear":
+ Xr = numpy.matrix(numpy.random.multivariate_normal(Xa.A1,A)).T
+ Yr = numpy.matrix(numpy.ravel( Hm( Xr ) )).T
+ if YfQ is None:
+ YfQ = Yr
+ else:
+ YfQ = numpy.hstack((YfQ,Yr))
+ YfQ.sort(axis=-1)
+ YQ = None
+ for quantile in selfA._parameters["Quantiles"]:
+ if not (0. <= float(quantile) <= 1.): continue
+ indice = int(nech * float(quantile) - 1./nech)
+ if YQ is None: YQ = YfQ[:,indice]
+ else: YQ = numpy.hstack((YQ,YfQ[:,indice]))
+ selfA.StoredVariables["SimulationQuantiles"].store( YQ )
+ if selfA._toStore("SimulatedObservationAtBackground"):
+ selfA.StoredVariables["SimulatedObservationAtBackground"].store( numpy.ravel(HXb) )
+ if selfA._toStore("SimulatedObservationAtOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtOptimum"].store( numpy.ravel(HXa) )
+ #
+ return 0
+
+# ==============================================================================
+def mlef(selfA, Xb, Y, U, HO, EM, CM, R, B, Q, VariantM="MLEF13",
+ BnotT=False, _epsilon=1.e-3, _e=1.e-7, _jmax=15000):
+ """
+ Maximum Likelihood Ensemble Filter
+ """
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA._parameters["StoreInternalVariables"] = True
+ #
+ # Opérateurs
+ # ----------
+ H = HO["Direct"].appliedControledFormTo
+ #
+ if selfA._parameters["EstimationOf"] == "State":
+ M = EM["Direct"].appliedControledFormTo
+ #
+ if CM is not None and "Tangent" in CM and U is not None:
+ Cm = CM["Tangent"].asMatrix(Xb)
+ else:
+ Cm = None
+ #
+ # Nombre de pas identique au nombre de pas d'observations
+ # -------------------------------------------------------
+ if hasattr(Y,"stepnumber"):
+ duration = Y.stepnumber()
+ __p = numpy.cumprod(Y.shape())[-1]
+ else:
+ duration = 2
+ __p = numpy.array(Y).size
+ #
+ # Précalcul des inversions de B et R
+ # ----------------------------------
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ BI = B.getI()
+ RI = R.getI()
+ #
+ # Initialisation
+ # --------------
+ __n = Xb.size
+ __m = selfA._parameters["NumberOfMembers"]
+ if hasattr(B,"asfullmatrix"): Pn = B.asfullmatrix(__n)
+ else: Pn = B
+ if hasattr(R,"asfullmatrix"): Rn = R.asfullmatrix(__p)
+ else: Rn = R
+ if hasattr(Q,"asfullmatrix"): Qn = Q.asfullmatrix(__n)
+ else: Qn = Q
+ Xn = EnsembleOfBackgroundPerturbations( Xb, None, __m )
+ #
+ if len(selfA.StoredVariables["Analysis"])==0 or not selfA._parameters["nextStep"]:
+ selfA.StoredVariables["Analysis"].store( Xb )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( Pn )
+ covarianceXa = Pn
+ #
+ previousJMinimum = numpy.finfo(float).max
+ #
+ for step in range(duration-1):
+ if hasattr(Y,"store"):
+ Ynpu = numpy.ravel( Y[step+1] ).reshape((__p,1))
+ else:
+ Ynpu = numpy.ravel( Y ).reshape((__p,1))
+ #
+ if U is not None:
+ if hasattr(U,"store") and len(U)>1:
+ Un = numpy.asmatrix(numpy.ravel( U[step] )).T
+ elif hasattr(U,"store") and len(U)==1:
+ Un = numpy.asmatrix(numpy.ravel( U[0] )).T
+ else:
+ Un = numpy.asmatrix(numpy.ravel( U )).T
+ else:
+ Un = None
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnBackgroundAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ if selfA._parameters["EstimationOf"] == "State": # Forecast + Q and observation of forecast
+ EMX = M( [(Xn[:,i], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ qi = numpy.random.multivariate_normal(numpy.zeros(__n), Qn, size=__m).T
+ Xn_predicted = EMX + qi
+ if Cm is not None and Un is not None: # Attention : si Cm est aussi dans M, doublon !
+ Cm = Cm.reshape(__n,Un.size) # ADAO & check shape
+ Xn_predicted = Xn_predicted + Cm * Un
+ elif selfA._parameters["EstimationOf"] == "Parameters": # Observation of forecast
+ # --- > Par principe, M = Id, Q = 0
+ Xn_predicted = Xn
+ #
+ #--------------------------
+ if VariantM == "MLEF13":
+ Xfm = numpy.ravel(Xn_predicted.mean(axis=1, dtype=mfp).astype('float'))
+ EaX = EnsembleOfAnomalies( Xn_predicted, Xfm, 1./math.sqrt(__m-1) )
+ Ua = numpy.identity(__m)
+ __j = 0
+ Deltaw = 1
+ if not BnotT:
+ Ta = numpy.identity(__m)
+ vw = numpy.zeros(__m)
+ while numpy.linalg.norm(Deltaw) >= _e and __j <= _jmax:
+ vx1 = (Xfm + EaX @ vw).reshape((__n,1))
+ #
+ if BnotT:
+ E1 = vx1 + _epsilon * EaX
+ else:
+ E1 = vx1 + math.sqrt(__m-1) * EaX @ Ta
+ #
+ HE2 = H( [(E1[:,i,numpy.newaxis], Un) for i in range(__m)],
+ argsAsSerie = True,
+ returnSerieAsArrayMatrix = True )
+ vy2 = HE2.mean(axis=1, dtype=mfp).astype('float').reshape((__p,1))
+ #
+ if BnotT:
+ EaY = (HE2 - vy2) / _epsilon
+ else:
+ EaY = ( (HE2 - vy2) @ numpy.linalg.inv(Ta) ) / math.sqrt(__m-1)
+ #
+ GradJ = numpy.ravel(vw[:,None] - EaY.transpose() @ (RI * ( Ynpu - vy2 )))
+ mH = numpy.identity(__m) + EaY.transpose() @ (RI * EaY)
+ Deltaw = - numpy.linalg.solve(mH,GradJ)
+ #
+ vw = vw + Deltaw
+ #
+ if not BnotT:
+ Ta = numpy.real(scipy.linalg.sqrtm(numpy.linalg.inv( mH )))
+ #
+ __j = __j + 1
+ #
+ if BnotT:
+ Ta = numpy.real(scipy.linalg.sqrtm(numpy.linalg.inv( mH )))
+ #
+ Xn = vx1 + math.sqrt(__m-1) * EaX @ Ta @ Ua
+ #--------------------------
+ else:
+ raise ValueError("VariantM has to be chosen in the authorized methods list.")
+ #
+ if selfA._parameters["InflationType"] == "MultiplicativeOnAnalysisAnomalies":
+ Xn = CovarianceInflation( Xn,
+ selfA._parameters["InflationType"],
+ selfA._parameters["InflationFactor"],
+ )
+ #
+ Xa = Xn.mean(axis=1, dtype=mfp).astype('float').reshape((__n,1))
+ #--------------------------
+ #
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("APosterioriCovariance") \
+ or selfA._toStore("InnovationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentAnalysis") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ _HXa = numpy.asmatrix(numpy.ravel( H((Xa, Un)) )).T
+ _Innovation = Ynpu - _HXa
+ #
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ # ---> avec analysis
+ selfA.StoredVariables["Analysis"].store( Xa )
+ if selfA._toStore("SimulatedObservationAtCurrentAnalysis"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"].store( _HXa )
+ if selfA._toStore("InnovationAtCurrentAnalysis"):
+ selfA.StoredVariables["InnovationAtCurrentAnalysis"].store( _Innovation )
+ # ---> avec current state
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CurrentState"):
+ selfA.StoredVariables["CurrentState"].store( Xn )
+ if selfA._toStore("ForecastState"):
+ selfA.StoredVariables["ForecastState"].store( EMX )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( EMX - Xa )
+ if selfA._toStore("InnovationAtCurrentState"):
+ selfA.StoredVariables["InnovationAtCurrentState"].store( - HE2 + Ynpu )
+ if selfA._toStore("SimulatedObservationAtCurrentState") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentState"].store( HE2 )
+ # ---> autres
+ if selfA._parameters["StoreInternalVariables"] \
+ or selfA._toStore("CostFunctionJ") \
+ or selfA._toStore("CostFunctionJb") \
+ or selfA._toStore("CostFunctionJo") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("APosterioriCovariance"):
+ Jb = float( 0.5 * (Xa - Xb).T * BI * (Xa - Xb) )
+ Jo = float( 0.5 * _Innovation.T * RI * _Innovation )
+ J = Jb + Jo
+ selfA.StoredVariables["CostFunctionJb"].store( Jb )
+ selfA.StoredVariables["CostFunctionJo"].store( Jo )
+ selfA.StoredVariables["CostFunctionJ" ].store( J )
+ #
+ if selfA._toStore("IndexOfOptimum") \
+ or selfA._toStore("CurrentOptimum") \
+ or selfA._toStore("CostFunctionJAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJbAtCurrentOptimum") \
+ or selfA._toStore("CostFunctionJoAtCurrentOptimum") \
+ or selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ IndexMin = numpy.argmin( selfA.StoredVariables["CostFunctionJ"][nbPreviousSteps:] ) + nbPreviousSteps
+ if selfA._toStore("IndexOfOptimum"):
+ selfA.StoredVariables["IndexOfOptimum"].store( IndexMin )
+ if selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentOptimum"].store( selfA.StoredVariables["Analysis"][IndexMin] )
+ if selfA._toStore("SimulatedObservationAtCurrentOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtCurrentOptimum"].store( selfA.StoredVariables["SimulatedObservationAtCurrentAnalysis"][IndexMin] )
+ if selfA._toStore("CostFunctionJbAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJbAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJb"][IndexMin] )
+ if selfA._toStore("CostFunctionJoAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJoAtCurrentOptimum"].store( selfA.StoredVariables["CostFunctionJo"][IndexMin] )
+ if selfA._toStore("CostFunctionJAtCurrentOptimum"):
+ selfA.StoredVariables["CostFunctionJAtCurrentOptimum" ].store( selfA.StoredVariables["CostFunctionJ" ][IndexMin] )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( EnsembleErrorCovariance(Xn) )
+ if selfA._parameters["EstimationOf"] == "Parameters" \
+ and J < previousJMinimum:
+ previousJMinimum = J
+ XaMin = Xa
+ if selfA._toStore("APosterioriCovariance"):
+ covarianceXaMin = Pn
+ #
+ # Stockage final supplémentaire de l'optimum en estimation de paramètres
+ # ----------------------------------------------------------------------
+ if selfA._parameters["EstimationOf"] == "Parameters":
+ selfA.StoredVariables["CurrentIterationNumber"].store( len(selfA.StoredVariables["Analysis"]) )
+ selfA.StoredVariables["Analysis"].store( XaMin )
+ if selfA._toStore("APosterioriCovariance"):
+ selfA.StoredVariables["APosterioriCovariance"].store( covarianceXaMin )
+ if selfA._toStore("BMA"):
+ selfA.StoredVariables["BMA"].store( numpy.ravel(Xb) - numpy.ravel(XaMin) )
+ #
+ return 0
+