outline general rules for depth estimation ambiguity of source depth depth estimation methods ...
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Outline General rules for depth estimation
Ambiguity of source depth Depth estimation methods
Based on characteristic shape of the anomaly Width at half amplitude Width between steepest slopes Gradient-based methods Graphical methods (linear slope, Peters, Sokolov’s)
Based on radial Fourier spectra Dominant wavelength Spectral slope (roll-off) Roy’s
Graphical methods for the top of the source E-line Werner’s (two methods) Logachev’s
Source-depth ambiguity Source depth cannot be unambiguously
determined from the recorded field Green’s equivalent layer (stratum) can be placed anywhere
below the observation surface This layer represents a distributed source Perfectly reproduces the field recorded on and above the survey
surface All methods of depth estimation look for “the simplest”
models: Explaining localized and pronounced gravity anomalies Try explaining them by compact sources
Principle Four key ideas for estimating the depth to the source:
1) Depth is proportional to the lateral extent w of the anomaly:
The question is how to measure this width conveniently
F is the formfactor depending on the shape of the source
2) Depth is inversely proportional to the gradients of log(Dg):
3) Depth is inversely proportional to the dominant wavenumber kD:
4) Depth is proportional to the roll-off of spectral amplitudes:
h Fw
1
D
h Fk
logd gh F
dk
To see that these quantities should be proportional to the depth, simply check their dimensionalities
1
logh F
d g dx
2 2
1
logh F
d g dx
or
Width-based method #1:Width at half amplitude If w is measured at half of the peak amplitude w =
w1/2, then, for a spherical monopole source:
and therefore F = 0.65.
2/31/2 2 2 1
0.65
hw h
For a line source (rod, pipe) in the direction across its strike: F = 0.5.
For this method, the regional trend should be carefully removed The trend distorts the reading of w1/2.
See pdf notes
Width-based method #2:Width between steepest points If w is measured between the points of steepest
dDg/dx, then for a spherical anomaly:and therefore F = 1.
2w h
For a line source (rod, pipe) across strike: 2
1.153
F
Steepest-gradient points are more difficult to eyeball, but this w is practically unaffected by the regional trend The trend only adds a constant to the gradients
See pdf notes
Gradient-based method #1 h is estimated from the gradient of logDg (scale-invariant
gravity anomaly) at the point of largest dDg/dx:
For a line source (rod, pipe) across strike: 30.87
2F
1
log
gh F F
d g dx d g dx
For a spherical (point, box) source: 1.2F See pdf notes
Gradient-based method #2 Quantities Dg and dDg/dx can also be measured at points
of their respective largest magnitudes. Then:
For a line source (rod, pipe) across strike: 90.65
8 3F
max
max
gh F
d g dx
For a spherical (point, box) source: 0.86F See pdf notes
Gradient-based method #3 Using the second derivative d2Dg/dx2 (curvature) and Dg
at the peak of Dg:
For a spherical (point, box) source: For a line source (rod, pipe) across strike, F is the same This suggests a method for any shape in the next slide
3 1.73F See pdf notes
2 2
gh F
d g dx
Gradient-based method #4 If we use upward continuation to evaluate the
second vertical derivative of the field:
6 2.45F
2 2
gh F
d g dz
2 2 2
2 2 2
g g g
z x y
Poisson’s equation
then for any shape of the source, the two second horizontal derivatives can be replaced with a vertical one:
and the formfactor becomes:
Graphical shape-based methods for depth
Slightly different combinations of the steepest slope dDg/dx with Dg taken at different points
See pages 16-20 in pdf notes Linear slope method Peters method Sokolov’s method
Graphical shape-based methods for horizontal position of the dipole source
Look for the position of the shallower (south in the northern hemisphere) pole of the effective dipole Remember that the measured positive high over this
pole is shifted to the south
Green is the observed field, blue and red are its constituents due to the north and south poles
Graphical shape-based methods for horizontal position of the dipole source
See pdf notes. Two groups of methods:
1) Using only the main lobe of DT (x) Werner’s methods – use bisectors of two or three chords of
the main lobe of DT (x)
2) Using both the positive and negative lobes E-line method – connect the positive high and negative
low; the intersection with DT (x) gives the x0 of the shallower pole
Logachev’s method – measure the positive high DThigh and negative low DTlow, then find the x0 such that:
0 high lowT x T T
Spectral method #1: Spectral roll-off Plot log(amplitude spectrum Dg(k)) vs. the absolute
value of radial wavenumber, See pdf notes
2 2x yk k k
From upward continuation, we know that the spectrum of a potential field is multiplied by “continuation factor” when the observation plane is shifted upward by Dz
For a source at depth h: Dg(x) is close to a pulse, Consequently the amplitude spectrum at the source level:
Therefore, the spectrum at the surface is:
Therefore, log(g) vs. |k| graph makes a straight line, with slope (-h):
ze k
source,g k z h g const
source, 0 hg k z g e k
sourcelog , 0 logg k z g h k
Spectral method #2: Roy’s method
3
maxg h h
Downward continue the field in small increments in h and plot the amplitude of the anomaly, Dgmax, as a function of h
The depth of the anomaly hmax corresponds to the “elbow” after which Dgmax(h) starts quickly increasing When approaching this depth, the amplitude of the anomaly
should increase as
This method is only “spectral” by the computation of the Dg(h) dependence
This has a fairly steep increase as h approaches hmax