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https://github.com/wassname/simpeg.git
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GudniRos
561 lines
19 KiB
Python
561 lines
19 KiB
Python
from SimPEG.EM.Utils.EMUtils import omega, mu_0
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from SimPEG import SolverLU as SimpegSolver, PropMaps, Utils, mkvc, sp, np
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from SimPEG.EM.FDEM.ProblemFDEM import BaseFDEMProblem
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from SurveyNSEM import Survey, Data
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from FieldsNSEM import BaseNSEMFields, Fields1D_ePrimSec, Fields3D_ePrimSec
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from SimPEG.NSEM.Utils.MT1Danalytic import getEHfields
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import time, sys
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class BaseNSEMProblem(BaseFDEMProblem):
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"""
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Base class for all Natural source problems.
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"""
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def __init__(self, mesh, **kwargs):
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BaseFDEMProblem.__init__(self, mesh, **kwargs)
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Utils.setKwargs(self, **kwargs)
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# Set the default pairs of the problem
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surveyPair = Survey
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dataPair = Data
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fieldsPair = BaseNSEMFields
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# Set the solver
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Solver = SimpegSolver
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solverOpts = {}
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verbose = False
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# Notes:
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# Use the forward and devs from BaseFDEMProblem
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# Might need to add more stuff here.
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## NEED to clean up the Jvec and Jtvec to use Zero and Identities for None components.
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def Jvec(self, m, v, f=None):
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"""
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Function to calculate the data sensitivities dD/dm times a vector.
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:param numpy.ndarray m (nC, 1) - conductive model
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:param numpy.ndarray v (nC, 1) - random vector
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:param NSEMfields object (optional) - NSEM fields object, if not given it is calculated
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:rtype: NSEMdata object
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:return: Data sensitivities wrt m
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"""
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# Calculate the fields
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if f is None:
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f= self.fields(m)
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# Set current model
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self.curModel = m
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# Initiate the Jv object
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Jv = self.dataPair(self.survey)
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# Loop all the frequenies
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for freq in self.survey.freqs:
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dA_du = self.getA(freq) #
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dA_duI = self.Solver(dA_du, **self.solverOpts)
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for src in self.survey.getSrcByFreq(freq):
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# We need fDeriv_m = df/du*du/dm + df/dm
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# Construct du/dm, it requires a solve
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# NOTE: need to account for the 2 polarizations in the derivatives.
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u_src = f[src,:] # u should be a vector by definition. Need to fix this...
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# dA_dm and dRHS_dm should be of size nE,2, so that we can multiply by dA_duI. The 2 columns are each of the polarizations.
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dA_dm = self.getADeriv_m(freq, u_src, v) # Size: nE,2 (u_px,u_py) in the columns.
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dRHS_dm = self.getRHSDeriv_m(freq, v) # Size: nE,2 (u_px,u_py) in the columns.
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if dRHS_dm is None:
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du_dm = dA_duI * ( -dA_dm )
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else:
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du_dm = dA_duI * ( -dA_dm + dRHS_dm )
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# Calculate the projection derivatives
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for rx in src.rxList:
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# Get the projection derivative
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# v should be of size 2*nE (for 2 polarizations)
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PDeriv_u = lambda t: rx.evalDeriv(src, self.mesh, f, t) # wrt u, we don't have have PDeriv wrt m
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Jv[src, rx] = PDeriv_u(mkvc(du_dm))
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dA_duI.clean()
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# Return the vectorized sensitivities
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return mkvc(Jv)
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def Jtvec(self, m, v, f=None):
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"""
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Function to calculate the transpose of the data sensitivities (dD/dm)^T times a vector.
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:param numpy.ndarray m (nC, 1) - conductive model
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:param numpy.ndarray v (nD, 1) - vector
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:param NSEMfields object f (optional) - NSEM fields object, if not given it is calculated
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:rtype: NSEMdata object
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:return: Data sensitivities wrt m
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"""
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if f is None:
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f = self.fields(m)
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self.curModel = m
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# Ensure v is a data object.
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if not isinstance(v, self.dataPair):
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v = self.dataPair(self.survey, v)
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Jtv = np.zeros(m.size)
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for freq in self.survey.freqs:
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AT = self.getA(freq).T
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ATinv = self.Solver(AT, **self.solverOpts)
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for src in self.survey.getSrcByFreq(freq):
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ftype = self._solutionType
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f_src = f[src, :] # Need to fix this...
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for rx in src.rxList:
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# Get the adjoint evalDeriv
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# PTv needs to be nE,
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PTv = rx.evalDeriv(src, self.mesh, f, mkvc(v[src, rx],2), adjoint=True) # wrt u, need possibility wrt m
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# Get the
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dA_duIT = ATinv * PTv
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dA_dmT = self.getADeriv_m(freq, f_src, mkvc(dA_duIT), adjoint=True)
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dRHS_dmT = self.getRHSDeriv_m(freq, mkvc(dA_duIT), adjoint=True)
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# Make du_dmT
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if dRHS_dmT is None:
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du_dmT = -dA_dmT
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else:
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du_dmT = -dA_dmT + dRHS_dmT
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# Select the correct component
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# du_dmT needs to be of size nC,
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real_or_imag = rx.projComp
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if real_or_imag == 'real':
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Jtv += du_dmT.real
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elif real_or_imag == 'imag':
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Jtv += -du_dmT.real
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else:
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raise Exception('Must be real or imag')
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# Clean the factorization, clear memory.
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ATinv.clean()
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return Jtv
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###################################
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## 1D problems
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###################################
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class Problem1D_ePrimSec(BaseNSEMProblem):
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"""
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A NSEM problem soving a e formulation and primary/secondary fields decomposion.
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By eliminating the magnetic flux density using
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.. math ::
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\mathbf{b} = \\frac{1}{i \omega}\\left(-\mathbf{C} \mathbf{e} \\right)
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we can write Maxwell's equations as a second order system in \\\(\\\mathbf{e}\\\) only:
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.. math ::
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\\left(\mathbf{C}^T \mathbf{M^e_{\mu^{-1}}} \mathbf{C} + i \omega \mathbf{M^f_\sigma}] \mathbf{e}_{s} =& i \omega \mathbf{M^f_{\delta \sigma}} \mathbf{e}_{p}
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which we solve for \\\(\\\mathbf{e_s}\\\). The total field \\\mathbf{e}\\ = \\\mathbf{e_p}\\ + \\\mathbf{e_s}\\.
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The primary field is estimated from a background model (commonly half space ).
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"""
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# From FDEMproblem: Used to project the fields. Currently not used for NSEMproblem.
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_solutionType = 'e_1dSolution'
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_formulation = 'EF'
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fieldsPair = Fields1D_ePrimSec
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# Initiate properties
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_sigmaPrimary = None
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def __init__(self, mesh, **kwargs):
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BaseNSEMProblem.__init__(self, mesh, **kwargs)
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# self._sigmaPrimary = sigmaPrimary
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@property
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def MeMui(self):
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"""
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Edge inner product matrix
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"""
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if getattr(self, '_MeMui', None) is None:
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self._MeMui = self.mesh.getEdgeInnerProduct(1.0/mu_0)
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return self._MeMui
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@property
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def MfSigma(self):
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"""
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Edge inner product matrix
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"""
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if getattr(self, '_MfSigma', None) is None:
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self._MfSigma = self.mesh.getFaceInnerProduct(self.curModel.sigma)
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return self._MfSigma
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@property
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def sigmaPrimary(self):
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"""
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A background model, use for the calculation of the primary fields.
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"""
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return self._sigmaPrimary
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@sigmaPrimary.setter
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def sigmaPrimary(self, val):
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# Note: TODO add logic for val, make sure it is the correct size.
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self._sigmaPrimary = val
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def getA(self, freq):
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"""
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Function to get the A matrix.
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:param float freq: Frequency
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:rtype: scipy.sparse.csr_matrix
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:return: A
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"""
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# Note: need to use the code above since in the 1D problem I want
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# e to live on Faces(nodes) and h on edges(cells). Might need to rethink this
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# Possible that _fieldType and _eqLocs can fix this
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MeMui = self.MeMui
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MfSigma = self.MfSigma
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C = self.mesh.nodalGrad
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# Make A
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A = C.T*MeMui*C + 1j*omega(freq)*MfSigma
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# Either return full or only the inner part of A
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return A
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def getADeriv_m(self, freq, u, v, adjoint=False):
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"""
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The derivative of A wrt sigma
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"""
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dsig_dm = self.curModel.sigmaDeriv
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MeMui = self.MeMui
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#
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u_src = u['e_1dSolution']
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dMfSigma_dm = self.mesh.getFaceInnerProductDeriv(self.curModel.sigma)(u_src) * self.curModel.sigmaDeriv
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if adjoint:
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return 1j * omega(freq) * ( dMfSigma_dm.T * v )
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# Note: output has to be nN/nF, not nC/nE.
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# v should be nC
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return 1j * omega(freq) * ( dMfSigma_dm * v )
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def getRHS(self, freq):
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"""
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Function to return the right hand side for the system.
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:param float freq: Frequency
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:rtype: numpy.ndarray (nF, 1), numpy.ndarray (nF, 1)
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:return: RHS for 1 polarizations, primary fields
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"""
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# Get sources for the frequncy(polarizations)
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Src = self.survey.getSrcByFreq(freq)[0]
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S_e = Src.S_e(self)
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return -1j * omega(freq) * S_e
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def getRHSDeriv_m(self, freq, v, adjoint=False):
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"""
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The derivative of the RHS wrt sigma
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"""
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Src = self.survey.getSrcByFreq(freq)[0]
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S_eDeriv = Src.S_eDeriv_m(self, v, adjoint)
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return -1j * omega(freq) * S_eDeriv
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def fields(self, m):
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'''
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Function to calculate all the fields for the model m.
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:param np.ndarray (nC,) m: Conductivity model
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'''
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# Set the current model
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self.curModel = m
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# Make the fields object
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F = self.fieldsPair(self.mesh, self.survey)
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# Loop over the frequencies
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for freq in self.survey.freqs:
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if self.verbose:
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startTime = time.time()
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print 'Starting work for {:.3e}'.format(freq)
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sys.stdout.flush()
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A = self.getA(freq)
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rhs = self.getRHS(freq)
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Ainv = self.Solver(A, **self.solverOpts)
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e_s = Ainv * rhs
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# Store the fields
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Src = self.survey.getSrcByFreq(freq)[0]
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# NOTE: only store the e_solution(secondary), all other components calculated in the fields object
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F[Src, 'e_1dSolution'] = e_s[:,-1] # Only storing the yx polarization as 1d
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# Note curl e = -iwb so b = -curl e /iw
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# b = -( self.mesh.nodalGrad * e )/( 1j*omega(freq) )
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# F[Src, 'b_1d'] = b[:,1]
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if self.verbose:
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print 'Ran for {:f} seconds'.format(time.time()-startTime)
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sys.stdout.flush()
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return F
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# Note this is not fully functional.
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# Missing:
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# Fields class corresponding to the fields
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# Update Jvec and Jtvec to include all the derivatives components
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# Other things ...
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class Problem1D_eTotal(BaseNSEMProblem):
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"""
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A NSEM problem solving a e formulation and a Total bondary domain decompostion.
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Solves the equation:
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Math:
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Have to do this...
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Not implement correctly.......
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"""
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# From FDEMproblem: Used to project the fields. Currently not used for NSEMproblem.
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_solutionType = 'e_1dSolution'
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_formulation = 'EF'
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# fieldsPair = Fields1D_eTotal
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def __init__(self, mesh, **kwargs):
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BaseNSEMProblem.__init__(self, mesh, **kwargs)
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@property
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def MeMui(self):
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"""
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Edge inner product matrix
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"""
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if getattr(self, '_MeMui', None) is None:
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self._MeMui = self.mesh.getEdgeInnerProduct(1.0/mu_0)
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return self._MeMui
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@property
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def MfSigma(self):
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"""
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Edge inner product matrix
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"""
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if getattr(self, '_MfSigma', None) is None:
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self._MfSigma = self.mesh.getFaceInnerProduct(self.curModel.sigma)
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return self._MfSigma
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def getA(self, freq, full=False):
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"""
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Function to get the A matrix.
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:param float freq: Frequency
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:param logic full: Return full A or the inner part
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:rtype: scipy.sparse.csr_matrix
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:return: A
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"""
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MeMui = self.MeMui
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MfSigma = self.MfSigma
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# Note: need to use the code above since in the 1D problem I want
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# e to live on Faces(nodes) and h on edges(cells). Might need to rethink this
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# Possible that _fieldType and _eqLocs can fix this
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# MeMui = self.MfMui
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# MfSigma = self.MfSigma
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C = self.mesh.nodalGrad
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# Make A
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A = C.T*MeMui*C + 1j*omega(freq)*MfSigma
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# Either return full or only the inner part of A
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if full:
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return A
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else:
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return A[1:-1,1:-1]
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def getADeriv_m(self, freq, u, v, adjoint=False):
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raise NotImplementedError('getADeriv is not implemented')
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def getRHS(self, freq):
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"""
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Function to return the right hand side for the system.
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:param float freq: Frequency
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:rtype: numpy.ndarray (nE, 2), numpy.ndarray (nE, 2)
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:return: RHS for both polarizations, primary fields
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"""
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# Get sources for the frequency
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# NOTE: Need to use the source information, doesn't really apply in 1D
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src = self.survey.getSrcByFreq(freq)
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# Get the full A
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A = self.getA(freq,full=True)
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# Define the outer part of the solution matrix
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Aio = A[1:-1,[0,-1]]
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Ed, Eu, Hd, Hu = getEHfields(self.mesh,self.curModel.sigma,freq,self.mesh.vectorNx)
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Etot = (Ed + Eu)
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sourceAmp = 1.0
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Etot = ((Etot/Etot[-1])*sourceAmp) # Scale the fields to be equal to sourceAmp at the top
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## Note: The analytic solution is derived with e^iwt
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eBC = np.r_[Etot[0],Etot[-1]]
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# The right hand side
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return -Aio*eBC, eBC
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def getRHSderiv_m(self, freq, backSigma, u, v, adjoint=False):
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raise NotImplementedError('getRHSDeriv not implemented yet')
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return None
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def fields(self, m):
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'''
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Function to calculate all the fields for the model m.
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:param np.ndarray (nC,) m: Conductivity model
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:param np.ndarray (nC,) m_back: Background conductivity model
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'''
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self.curModel = m
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# RHS, CalcFields = self.getRHS(freq,m_back), self.calcFields
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F = Fields1D_eTotal(self.mesh, self.survey)
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for freq in self.survey.freqs:
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if self.verbose:
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startTime = time.time()
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print 'Starting work for {:.3e}'.format(freq)
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sys.stdout.flush()
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A = self.getA(freq)
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rhs, e_o = self.getRHS(freq)
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Ainv = self.Solver(A, **self.solverOpts)
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e_i = Ainv * rhs
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e = mkvc(np.r_[e_o[0], e_i, e_o[1]],2)
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# Store the fields
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Src = self.survey.getSrcByFreq(freq)
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# NOTE: only store e fields
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F[Src, 'e_1dSolution'] = e[:,0]
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if self.verbose:
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print 'Ran for {:f} seconds'.format(time.time()-startTime)
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sys.stdout.flush()
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return F
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###################################
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## 3D problems
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###################################
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class Problem3D_ePrimSec(BaseNSEMProblem):
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"""
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A NSEM problem solving a e formulation and a primary/secondary fields decompostion.
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By eliminating the magnetic flux density using
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.. math ::
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\mathbf{b} = \\frac{1}{i \omega}\\left(-\mathbf{C} \mathbf{e} \\right)
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we can write Maxwell's equations as a second order system in \\\(\\\mathbf{e}\\\) only:
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.. math ::
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\\left(\mathbf{C}^T \mathbf{M^f_{\mu^{-1}}} \mathbf{C} + i \omega \mathbf{M^e_\sigma}] \mathbf{e}_{s} =& i \omega \mathbf{M^e_{\delta \sigma}} \mathbf{e}_{p}
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which we solve for \\\(\\\mathbf{e_s}\\\). The total field \\\mathbf{e}\\ = \\\mathbf{e_p}\\ + \\\mathbf{e_s}\\.
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The primary field is estimated from a background model (commonly as a 1D model).
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"""
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# From FDEMproblem: Used to project the fields. Currently not used for NSEMproblem.
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_solutionType = [ 'e_pxSolution', 'e_pySolution'] # Forces order on the object
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_formulation = 'EB'
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fieldsPair = Fields3D_ePrimSec
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# Initiate properties
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_sigmaPrimary = None
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def __init__(self, mesh, **kwargs):
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BaseNSEMProblem.__init__(self, mesh, **kwargs)
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@property
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def sigmaPrimary(self):
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"""
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A background model, use for the calculation of the primary fields.
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"""
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return self._sigmaPrimary
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@sigmaPrimary.setter
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def sigmaPrimary(self, val):
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# Note: TODO add logic for val, make sure it is the correct size.
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self._sigmaPrimary = val
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def getA(self, freq):
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"""
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Function to get the A system.
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:param float freq: Frequency
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:rtype: scipy.sparse.csr_matrix
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:return: A
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"""
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Mmui = self.MfMui
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Msig = self.MeSigma
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C = self.mesh.edgeCurl
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return C.T*Mmui*C + 1j*omega(freq)*Msig
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def getADeriv_m(self, freq, u, v, adjoint=False):
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"""
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Calculate the derivative of A wrt m.
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"""
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# Fix u to be a matrix nE,2
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# This considers both polarizations and returns a nE,2 matrix for each polarization
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if adjoint:
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dMe_dsigV = sp.hstack(( self.MeSigmaDeriv( u['e_pxSolution'] ).T, self.MeSigmaDeriv(u['e_pySolution'] ).T ))*v
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else:
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# Need a nE,2 matrix to be returned
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dMe_dsigV = np.hstack(( mkvc(self.MeSigmaDeriv( u['e_pxSolution'] )*v,2), mkvc( self.MeSigmaDeriv(u['e_pySolution'] )*v,2) ))
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return 1j * omega(freq) * dMe_dsigV
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def getRHS(self, freq):
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"""
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Function to return the right hand side for the system.
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:param float freq: Frequency
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:rtype: numpy.ndarray (nE, 2), numpy.ndarray (nE, 2)
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:return: RHS for both polarizations, primary fields
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"""
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# Get sources for the frequncy(polarizations)
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Src = self.survey.getSrcByFreq(freq)[0]
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S_e = Src.S_e(self)
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return -1j * omega(freq) * S_e
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def getRHSDeriv_m(self, freq, v, adjoint=False):
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"""
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|
The derivative of the RHS with respect to sigma
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|
"""
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|
|
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Src = self.survey.getSrcByFreq(freq)[0]
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S_eDeriv = Src.S_eDeriv_m(self, v, adjoint)
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return -1j * omega(freq) * S_eDeriv
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def fields(self, m):
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'''
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|
Function to calculate all the fields for the model m.
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:param np.ndarray (nC,) m: Conductivity model
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'''
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|
# Set the current model
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self.curModel = m
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|
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F = self.fieldsPair(self.mesh, self.survey)
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for freq in self.survey.freqs:
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if self.verbose:
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|
startTime = time.time()
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|
print 'Starting work for {:.3e}'.format(freq)
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|
sys.stdout.flush()
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|
A = self.getA(freq)
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rhs = self.getRHS(freq)
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|
# Solve the system
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|
Ainv = self.Solver(A, **self.solverOpts)
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e_s = Ainv * rhs
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|
|
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# Store the fields
|
|
Src = self.survey.getSrcByFreq(freq)[0]
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|
# Store the fields
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|
# Use self._solutionType
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|
F[Src, 'e_pxSolution'] = e_s[:,0]
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|
F[Src, 'e_pySolution'] = e_s[:,1]
|
|
# Note curl e = -iwb so b = -curl/iw
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|
|
|
if self.verbose:
|
|
print 'Ran for {:f} seconds'.format(time.time()-startTime)
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|
sys.stdout.flush()
|
|
Ainv.clean()
|
|
return F
|