Distributed Acoustic Sensing in Geophysics. Группа авторов
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Название: Distributed Acoustic Sensing in Geophysics
Автор: Группа авторов
Издательство: John Wiley & Sons Limited
Жанр: Физика
isbn: 9781119521778
isbn:
For simplicity of further calculations, the reflective coefficient r0(z) can be redefined as the effective reflective coefficient r(z):
Then, to extract the Doppler shift from the intensity equation, we need to control the phase shift ψ0 between delayed optical fields in the interferometer. So Equation 1.1 can be rearranged using Equations 1.2–1.4 to:
Here the convolution symbol ⊗ is used to simplify the expression, and the OTDR scale z = 2ct′ for the “fast” time t′ is used. The convolution commutes with translations (Goodman, 2005), meaning that Equation 1.5 can be converted using a(z1 − z2) ⊗ b(z1) = a(z1) ⊗ b(z1 − z2) to:
Let us consider first the simple case of short pulse e(z) = δ(z) when δ is the Dirac delta function. Then convolution can be removed from Equation 1.5 because δ(z) ⊗ a(z) = a(z), and the distance variation of Doppler shift ΔΩ(z) = Ω(z) − Ω(z − L0) can be represented via variation of intensity I(z, t) = E(z, t)E(z, t)*. The expression in braces in Equation 1.6 represents a two‐beam interference, so the intensity will vary harmonically depending on the phase. As we are interested in the intensity change, only the interference term needs be taken into consideration, which can be reshaped using the intensity derivative:
(1.7)
Then using convolution properties ∂[a ⊗ b(t)]/∂t = a ⊗ ∂b(t)/∂t, we can find intensity variation via phase shift Φ of backscattered light where there is argument of backscattering complex function:
The COTDR signal can be deduced from Equation 1.8 if we set L0 = 0 and ψ0 = 0. Even such a simple setup can deliver information on the Doppler shift and hence the ground speed v(z) through the intensity variation ∂I/∂t ∝ Δv in accordance with Equations 1.3, 1.8. Unfortunately, the proportionality factor contains an oscillation term, so we cannot distinguish positive speed from negative.
The result of computer modeling of a COTDR response on a differential Ricker wavelet for ground speed (Hartog, 2017) is presented in Figure 1.5. The right side shows 1D seismic wave moving in the z direction (in m) with a reflection from an interface with a positive reflection coefficient. Below the image is a time series of apparent velocity, when units are normalized to the expected optical phase shift in radians between points separated by gauge length 10 m. The left side of the figure corresponds to the relative pulse‐to‐pulse variation of the COTDR signal calculated in accordance with Equations 1.8–1.9. The sign of response changes randomly in accordance with an optical pulsewidth of 50 ns or 5 m. As a result, the signal cannot be effectively accumulated for multiple seismic pulselosityes because of the temperature drift between seismic shots. Temperature drift changes the phase constant of the fiber β0 and, in accordance with Equation 1.4, the effective reflection coefficient r(z) also changes. As a result of such drift, every seismic shot will have a unique, random, alternating, speckle‐like signature that cancels the averaging sum. Fortunately, this problem can be overcome by optical phase recovery, when, after similar averaging, average values appear. Thus, the actual DAS output will be a combination of fiber speed information and the unaveraged portion of the random COTDR signal.