PyLops
pylops.waveeqprocessing.SeismicInterpolation¶
- pylops.waveeqprocessing.SeismicInterpolation(data, nrec, iava, iava1=None, kind='fk', nffts=None, sampling=None, spataxis=None, spat1axis=None, taxis=None, paxis=None, p1axis=None, centeredh=True, nwins=None, nwin=None, nover=None, engine='numba', dottest=False, **kwargs_solver)[source]¶
Seismic interpolation (or regularization).
Interpolate seismic data from irregular to regular spatial grid. Depending on the size of the input
data, interpolation is either 2- or 3-dimensional. In case of 3-dimensional interpolation, data can be irregularly sampled in either one or both spatial directions.- Parameters:
- data
numpy.ndarray Irregularly sampled seismic data of size \([n_{r_y} \,(\times n_{r_x} \times n_t)]\)
- nrec
intortuple Number of elements in the regularly sampled (reconstructed) spatial array, \(n_{R_y}\) for 2-dimensional data and \((n_{R_y}, n_{R_x})\) for 3-dimensional data
- iava
listornumpy.ndarray Integer (or floating) indices of locations of available samples in first dimension of regularly sampled spatial grid of interpolated signal. The
pylops.basicoperators.Restrictionoperator is used in case of integer indices, while thepylops.signalprocessing.Iterpoperator is used in case of floating indices.- iava1
listornumpy.ndarray, optional Integer (or floating) indices of locations of available samples in second dimension of regularly sampled spatial grid of interpolated signal. Can be used only in case of 3-dimensional data.
- kind
str, optional Type of inversion:
fk(default),spatial,radon-linear,chirpradon-linear,radon-parabolic,radon-hyperbolic,sliding, orchirp-sliding- nffts
intortuple, optional nffts :
tuple, optional Number of samples in Fourier Transform for each direction. Required ifkind='fk'- sampling
tuple, optional Sampling steps
dy(,dx) anddt. Required ifkind='fk'orkind='radon-linear'- spataxis
numpy.ndarray, optional First spatial axis. Required for
kind='radon-linear',kind='chirpradon-linear',kind='radon-parabolic',kind='radon-hyperbolic', can also be provided instead ofsamplingforkind='fk'- spat1axis
numpy.ndarray, optional Second spatial axis. Required for
kind='radon-linear',kind='chirpradon-linear',kind='radon-parabolic',kind='radon-hyperbolic', can also be provided instead ofsamplingforkind='fk'- taxis
numpy.ndarray, optional Time axis. Required for
kind='radon-linear',kind='chirpradon-linear',kind='radon-parabolic',kind='radon-hyperbolic', can also be provided instead ofsamplingforkind='fk'- paxis
numpy.ndarray, optional First Radon axis. Required for
kind='radon-linear',kind='chirpradon-linear',kind='radon-parabolic',kind='radon-hyperbolic',kind='sliding', andkind='chirp-sliding'- p1axis
numpy.ndarray, optional Second Radon axis. Required for
kind='radon-linear',kind='chirpradon-linear',kind='radon-parabolic',kind='radon-hyperbolic',kind='sliding', andkind='chirp-sliding'- centeredh
bool, optional Assume centered spatial axis (
True) or not (False). Required forkind='radon-linear',kind='radon-parabolic'andkind='radon-hyperbolic'- nwins
intortuple, optional Number of windows. Required for
kind='sliding'andkind='chirp-sliding'- nwin
intortuple, optional Number of samples of window. Required for
kind='sliding'andkind='chirp-sliding'- nover
intortuple, optional Number of samples of overlapping part of window. Required for
kind='sliding'andkind='chirp-sliding'- engine
str, optional Engine used for Radon computations (
numpy/numbaforRadon2DandRadon3Dornumpy/fftwforChirpRadon2DandChirpRadon3D)- dottest
bool, optional Apply dot-test
- **kwargs_solver
Arbitrary keyword arguments for
pylops.optimization.leastsquares.regularized_inversionsolver ifkind='spatial'orpylops.optimization.sparsity.FISTAsolver otherwise
- data
- Returns:
- recdata
numpy.ndarray Reconstructed data of size \([n_{R_y}\,(\times n_{R_x} \times n_t)]\)
- recprec
numpy.ndarray Reconstructed data in the sparse or preconditioned domain in case of
kind='fk',kind='radon-linear',kind='radon-parabolic',kind='radon-hyperbolic'andkind='sliding'- cost
numpy.ndarray Cost function norm
- recdata
- Raises:
- KeyError
If
kindis neitherspatial,fl,radon-linear,radon-parabolic,radon-hyperbolicnorsliding
Notes
The problem of seismic data interpolation (or regularization) can be formally written as
\[\mathbf{y} = \mathbf{R} \mathbf{x}\]where a restriction or interpolation operator is applied along the spatial direction(s). Here \(\mathbf{y} = [\mathbf{y}_{R1}^T, \mathbf{y}_{R2}^T,\ldots, \mathbf{y}_{RN^T}]^T\) where each vector \(\mathbf{y}_{Ri}\) contains all time samples recorded in the seismic data at the specific receiver \(R_i\). Similarly, \(\mathbf{x} = [\mathbf{x}_{r1}^T, \mathbf{x}_{r2}^T,\ldots, \mathbf{x}_{rM}^T]\), contains all traces at the regularly and finely sampled receiver locations \(r_i\).
Several alternative approaches can be taken to solve such a problem. They mostly differ in the choice of the regularization (or preconditining) used to mitigate the ill-posedness of the problem:
spatial: least-squares inversion in the original time-space domain with an additional spatial smoothing regularization term, corresponding to the cost function \(J = ||\mathbf{y} - \mathbf{R} \mathbf{x}||_2 + \epsilon_\nabla \nabla ||\mathbf{x}||_2\) where \(\nabla\) is a second order space derivative implemented viapylops.basicoperators.SecondDerivativein 2-dimensional case andpylops.basicoperators.Laplacianin 3-dimensional casefk: L1 inversion in frequency-wavenumber preconditioned domain corresponding to the cost function \(J = ||\mathbf{y} - \mathbf{R} \mathbf{F} \mathbf{x}||_2\) where \(\mathbf{F}\) is frequency-wavenumber transform implemented viapylops.signalprocessing.FFT2Din 2-dimensional case andpylops.signalprocessing.FFTNDin 3-dimensional caseradon-linear: L1 inversion in linear Radon preconditioned domain using the same cost function asfkbut with \(\mathbf{F}\) being a Radon transform implemented viapylops.signalprocessing.Radon2Din 2-dimensional case andpylops.signalprocessing.Radon3Din 3-dimensional caseradon-parabolic: L1 inversion in parabolic Radon preconditioned domainradon-hyperbolic: L1 inversion in hyperbolic Radon preconditioned domainsliding: L1 inversion in sliding-linear Radon preconditioned domain using the same cost function asfkbut with \(\mathbf{F}\) being a sliding Radon transform implemented viapylops.signalprocessing.Sliding2Din 2-dimensional case andpylops.signalprocessing.Sliding3Din 3-dimensional case
