Magnetotelluric data

The magnetotelluric (MT) method is a passive method using as a source variations in Earth’s magnetic field, which create telluric currents in the Earth. The variation of Earth’s magnetic field has many origins, e.g., lightning or the interaction between the Earth’s magnetic field and solar wind.

Ubiquitous in MT is the plane-wave approximation, hence, that the source signal is a plane wave hitting the Earth’s surface. Having a 1D source (vertical plane wave) for a layered, 1D model reduces the computation of the impedances and from there the apparent resistivity and apparent phase a simple recursion algorithm. As such it does not make sense to use a full EM wavefield algorithm with three-dimensional sources such as empymod to compute MT responses. However, it is still interesting to see if we can compute MT impedances with a three-dimensional point source.

As background theory we reproduce here Equations (11) to (17) from Pedersen and Hermance (1986), with surrounding text. For a more in-depth read we refer to Chave and Jones (2012).


If we define the impedance as

(1)\[Z = E_x / H_y \, ,\]

[…] we can develop a recursive relationship for the impedance at the top of the j-th layer looking down

(2)\[Z_j = z_{oj} \frac{1-R_j \exp(-2\gamma_j t_j)}{1+R_j \exp(-2\gamma_j t_j)} \, , \quad j = N-1, \dots, 1 \, ,\]

where

(3)\[z_{oj} \equiv \text{intrinsic impedance} \equiv \sqrt{\rm{i}\omega \mu \rho_j} \, ,\]
(4)\[R_j \equiv \text{reflection coefficient} \equiv \frac{z_{oj} - Z_{j+1}}{z_{oj} + Z_{j+1}} \, ,\]
\[t_j = \text{thickness of layer} j \, ,\]

and the impedance at the surface of the deepest layer (\(j=N\)) is given by

(5)\[Z_N = z_{oN}\, .\]

The surface impedance, \(Z_j\), is found by applying Equation (2) recursively from the top of the bottom half-space, \(j = N\), and propagating upwards. From the surface impedance, \(Z_1\), we can then calculate the apparent resistivity, \(\rho_a\), and phase, \(\theta_a\), as

(6)\[\rho_a = \frac{|Z_1|^2}{\omega \mu} \, ,\]
(7)\[\theta_a = \tan^{-1}\frac{\Im(Z1)}{\Re(Z_1)} \, .\]

This calculation is repeated for a range of periods and is used to model the magnetotelluric response of the layered structure.


Reference:

import empymod
import numpy as np
import matplotlib.pyplot as plt
from scipy.constants import mu_0
plt.style.use('ggplot')

Define model parameter and frequencies

resistivities = np.array([2e14, 300, 2500, 0.8, 3000, 2500])
depths = np.array([0, 200, 600, 640, 1140])
frequencies = np.logspace(-4, 5, 101)
omega = 2 * np.pi * frequencies

1D-MT recursion following Pedersen & Hermance

Using the variable names as in the paper.

# Initiate recursive formula with impedance of the deepest layer.
Z_j = np.sqrt(2j * np.pi * frequencies * mu_0 * resistivities[-1])

# Move up the stack of layers till the top (without air).
for j in range(depths.size-1, 0, -1):

    # Thickness
    t_j = depths[j] - depths[j-1]

    # Intrinsic impedance
    z_oj = np.sqrt(1j * omega * mu_0 * resistivities[j])

    # Reflection coefficient
    R_j = (z_oj - Z_j) / (z_oj + Z_j)

    # Exponential factor
    gamma_j = np.sqrt(1j * omega * mu_0 / resistivities[j])
    exp_j = np.exp(-2 * gamma_j * t_j)

    # Impedance at this layer
    Z_j = z_oj * (1 - R_j * exp_j) / (1 + R_j * exp_j)

# Step 3. Compute apparent resistivity last impedance
apres_mt1d = abs(Z_j)**2/(omega * mu_0)
phase_mt1d = np.arctan2(Z_j.imag, Z_j.real)

1D MT using empymod

The above derivation and code assume plane waves. We can “simulate” plane waves by putting the source _very_ far away. In this example, we set it one million km away in all directions. As the impedance is the ratio of the Ex and Hy fields the source type (electric or magnetic) and the source orientation do not matter; hence, it can be an arbitrarily rotated electric or magnetic source, the apparent resistivity and apparent phase will always be the same.

dist = 1_000_000_000  # 1 million kilometer (!)
inp = {
    'src': (-dist, -dist, -dist),
    'rec': (0, 0, 0.1),
    'res': resistivities,
    'depth': depths,
    'freqtime': frequencies,
    'verb': 1,
}

# Get Ex, Hy.
ex = empymod.dipole(ab=11, **inp)
hy = empymod.dipole(ab=51, **inp)

# Impedance.
Z = ex/hy

# Apparent resistivity and apparent phase.
apres_empy = abs(Z)**2 / (omega * mu_0)
phase_empy = np.arctan2(Z.imag, Z.real)

Plot results

fig, (ax1, ax2) = plt.subplots(1, 2, figsize=(9, 4))

ax1.set_title('Apparent resistivity')
ax1.plot(frequencies, apres_mt1d, label='MT-1D')
ax1.plot(frequencies, apres_empy, '--', label='empymod')
ax1.set_xscale('log')
ax1.set_yscale('log')
ax1.set_xlabel('Frequency (Hz)')
ax1.set_ylabel(r'Apparent resistivity ($\Omega\,$m)')
ax1.legend()

ax2.set_title('Phase')
ax2.plot(frequencies, phase_mt1d*180/np.pi)
ax2.plot(frequencies, phase_empy*180/np.pi, '--')
ax2.set_xscale('log')
ax2.yaxis.tick_right()
ax2.set_xlabel('Frequency (Hz)')
ax2.set_ylabel('Phase (degree)')
ax2.yaxis.set_label_position("right")

fig.tight_layout()
fig.show()
Apparent resistivity, Phase
empymod.Report()
Fri Mar 26 17:35:04 2021 UTC
OS Linux CPU(s) 2 Machine x86_64
Architecture 64bit RAM 7.6 GB Environment Python
Python 3.7.9 (default, Oct 19 2020, 15:13:17) [GCC 7.5.0]
numpy 1.20.1 scipy 1.6.2 numba 0.53.1
empymod 2.0.6 matplotlib 3.4.0


Total running time of the script: ( 0 minutes 1.064 seconds)

Estimated memory usage: 9 MB

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