+ # 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
+ # ---------------
+ Hm = HO["Direct"].appliedTo
+ #
+ BI = B.getI()
+ RI = R.getI()
+ #
+ HXb = numpy.asarray(Hm( Xb )).reshape((-1,1))
+ Innovation = Y - HXb
+ #
+ # Outer Loop
+ # ----------
+ iOuter = 0
+ J = 1./mpr
+ DeltaJ = 1./mpr
+ Xr = numpy.asarray(selfA._parameters["InitializationPoint"]).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.asarray(dx).reshape((-1,1))
+ if selfA._parameters["StoreInternalVariables"] or \
+ selfA._toStore("CurrentState") or \
+ selfA._toStore("CurrentOptimum"):
+ selfA.StoredVariables["CurrentState"].store( Xb + _dX )
+ _HdX = (Ht @ _dX).reshape((-1,1))
+ _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.ravel( dx )
+ _HdX = (Ht @ _dX).reshape((-1,1))
+ _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(Xb.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ bounds = RecentredBounds(selfA._parameters["Bounds"], Xb),
+ 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(Xb.size),
+ fprime = GradientOfCostFunction,
+ args = (),
+ bounds = RecentredBounds(selfA._parameters["Bounds"], Xb),
+ 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(Xb.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(Xb.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(Xb.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]
+ else:
+ Minimum = Xb + Minimum.reshape((-1,1))
+ #
+ Xr = Minimum
+ DeltaJ = selfA.StoredVariables["CostFunctionJ" ][-1] - J
+ iOuter = selfA.StoredVariables["CurrentIterationNumber"][-1]
+ #
+ 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 )
+ #
+ 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"):
+ A = HessienneEstimation(Xa.size, HaM, HtM, BI, RI)
+ 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( 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( d )
+ if selfA._toStore("SigmaObs2"):
+ TraceR = R.trace(Y.size)
+ selfA.StoredVariables["SigmaObs2"].store( float( (d.T @ (numpy.ravel(Y)-numpy.ravel(HXa))) ) / TraceR )
+ if selfA._toStore("MahalanobisConsistency"):
+ selfA.StoredVariables["MahalanobisConsistency"].store( float( 2.*MinJ/d.size ) )
+ if selfA._toStore("SimulationQuantiles"):
+ QuantilesEstimations(selfA, A, Xa, HXa, Hm, HtM)
+ if selfA._toStore("SimulatedObservationAtBackground"):
+ selfA.StoredVariables["SimulatedObservationAtBackground"].store( HXb )
+ if selfA._toStore("SimulatedObservationAtOptimum"):
+ selfA.StoredVariables["SimulatedObservationAtOptimum"].store( 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,
+ Hybrid=None,
+ ):
+ """
+ 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
+ #
+ # Durée d'observation et tailles
+ 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()