simpeg.regularization.SmoothnessFirstOrder.f_m_deriv#
- SmoothnessFirstOrder.f_m_deriv(m)[source]#
Derivative of the regularization kernel function.
For first-order smoothness regularization in the x-direction, the derivative of the regularization kernel function with respect to the model is given by:
\[\frac{\partial \mathbf{f_m}}{\partial \mathbf{m}} = \mathbf{G_x}\]where \(\mathbf{G_x}\) is the partial cell gradient operator along x (i.e. the x-derivative).
- Parameters:
- m
numpy.ndarray
The model.
- m
- Returns:
scipy.sparse.csr_matrix
The derivative of the regularization kernel function.
Notes
The objective function for first-order smoothness regularization along the x-direction is given by:
\[\phi_m (\mathbf{m}) = \Big \| \mathbf{W G_x} \big [ \mathbf{m} - \mathbf{m}^{(ref)} \big ] \Big \|^2\]where \(\mathbf{m}\) are the discrete model parameters (model), \(\mathbf{m}^{(ref)}\) is the reference model, \(\mathbf{G_x}\) is the partial cell gradient operator along the x-direction (i.e. x-derivative), and \(\mathbf{W}\) is the weighting matrix. Similar for smoothness along y and z. See the
SmoothnessFirstOrder
class documentation for more detail.We define the regularization kernel function \(\mathbf{f_m}\) as:
\[\mathbf{f_m}(\mathbf{m}) = \mathbf{G_x} \big [ \mathbf{m} - \mathbf{m}^{(ref)} \big ]\]such that
\[\phi_m (\mathbf{m}) = \Big \| \mathbf{W \, f_m} \Big \|^2\]The derivative with respect to the model is therefore:
\[\frac{\partial \mathbf{f_m}}{\partial \mathbf{m}} = \mathbf{G_x}\]