In geophysics and reflection seismology, the Zoeppritz equations are a set of equations that describe the partitioning of seismic wave energy at an interface, due to mode conversion. They are named after their author, the German geophysicist Karl Bernhard Zoeppritz, who died before they were published in 1919.[1]
The equations are important in geophysics because they relate the amplitude of P-wave, incident upon a plane interface, and the amplitude of reflected and refracted P- and S-waves to the angle of incidence.[2] They are the basis for investigating the factors affecting the amplitude of a returning seismic wave when the angle of incidence is altered — also known as amplitude versus offset analysis — which is a helpful technique in the detection of petroleum reservoirs.
The Zoeppritz equations were not the first to describe the amplitudes of reflected and refracted waves at a plane interface. Cargill Gilston Knott used an approach in terms of potentials almost 20 years earlier, in 1899, to derive Knott's equations. Both approaches are valid, but Zoeppritz's approach is more easily understood.
The Zoeppritz equations consist of four equations with four unknowns
\begin{bmatrix}RP\\ RS\\ TP\\ TS\\ \end{bmatrix}= \begin{bmatrix} -\sin\theta1&-\cos\phi1&\sin\theta2&\cos\phi2\\ \cos\theta1&-\sin\phi1&\cos\theta2&-\sin\phi2\\ \sin2\theta1&
| VP1 | |
| VS1 |
\cos2\phi1&
| |||||||||||||
|
\sin2\theta2&
| \rho2VS2VP1 | ||||||||||||
|
\cos2\phi2\\ -\cos2\phi1&
| VS1 | |
| VP1 |
\sin2\phi1&
| \rho2VP2 | |
| \rho1VP1 |
\cos2\phi2&-
| \rho2VS2 | |
| \rho1VP1 |
| -1 | |
| \sin2\phi | |
| 2\end{bmatrix} |
\begin{bmatrix} \sin\theta1\\ \cos\theta1\\ \sin2\theta1\\ \cos2\phi1\\ \end{bmatrix}
RP, RS, TP, and TS, are the reflected P, reflected S, transmitted P, and transmitted S-wave amplitude coefficients, respectively,
{\theta}1
{\theta}2
{\phi}1
{\phi}2
Although the four equations can be solved for the four unknowns, they do not give an intuitive understanding for how the reflection amplitudes vary with the rock properties involved (density, velocity etc.).[3] Several attempts have been made to develop approximations to the Zoeppritz equations, such as Bortfeld's (1961) and Aki & Richards’ (1980),[4] but the most successful of these is the Shuey's, which assumes Poisson's ratio to be the elastic property most directly related to the angular dependence of the reflection coefficient.
The 3-term Shuey equation can be written a number of ways, the following is a common form:[5]
R(\theta)=R(0)+G\sin2\theta+F(\tan2\theta-\sin2\theta)
R(0)=
| 1 | |
| 2 |
\left(
| \DeltaVP | |
| VP |
+
| \Delta\rho | |
| \rho |
\right)
G=
| 1 | |
| 2 |
| \DeltaVP | |
| VP |
-2
| |||||||
|
\left(
| \Delta\rho | |
| \rho |
+2
| \DeltaVS | |
| VS |
\right)
F=
| 1 | |
| 2 |
| \DeltaVP | |
| VP |
where
{\theta}
{Vp}
{{\Delta}Vp}
{Vs}
{{\Delta}Vs}
{{\rho}}
{{\Delta}{\rho}}
A proposed better approximation of Zoeppritz equations:
R(\theta)=R(0)-A\sin2\theta
A=2
| |||||||
|
\left(
| \Delta\rho | |
| \rho |
+2
| \DeltaVS | |
| VS |
\right)
In the Shuey equation, R(0) is the reflection coefficient at normal incidence and is controlled by the contrast in acoustic impedances. G, often referred to as the AVO gradient, describes the variation of reflection amplitudes at intermediate offsets and the third term, F, describes the behaviour at large angles/far offsets that are close to the critical angle.This equation can be further simplified by assuming that the angle of incidence is less than 30 degrees (i.e. the offset is relatively small), so the third term will tend to zero. This is the case in most seismic surveys and gives the “Shuey approximation”:
R(\theta)=R(0)+G\sin2\theta
A full derivation of these equations can be found in most exploration geophysics text books, such as: