This invention relates generally to the field of geophysical prospecting, and more particularly to seismic data processing. Specifically, the invention is a method for migration of seismic data into datasets having common azimuth angle at the reflection point.
The present invention may be regarded as an extension of U.S. Pat. No. 7,095,678 “Method for seismic imaging in geologically complex formations” to Winbow and Clee, which document is incorporated by reference into the disclosure herein.
The technical problem primarily addressed herein is the class of depth imaging situations where azimuth information at each image point is needed. Such azimuth information should take account of 3D variation of velocity and anisotropy as well as the dip of the target reflectors. Such information is useful in understanding the fracture properties of carbonate reservoirs found, for example, in the Caspian and the Middle East. Such fracture information is important to efficient hydrocarbon exploration of and production from such reservoirs because it is an important influence on the porosity and permeability of petroleum reservoirs. Present ray based imaging methods such as Kirchhoff are computationally efficient but are limited to producing seismic volumes that have constant surface (i.e. source-receiver) azimuth. This is because the maps used in the migration only contain travel times and therefore are unable to direct the output into files depending on reflection angle or reflection point azimuth. Wave equation based methods are more time consuming and expensive than ray based imaging methods. Therefore there is a need for a ray-based method that can obtain azimuthal information at the reflection points. The method should migrate 3D seismic data into common reflection point azimuth seismic volumes using ray based imaging methods, where the azimuths are defined at the image point and are valid for any dip of the target reflector. The method should be applicable for any acquisition geometry whether it is land data, bottom cable data or marine data, provided that the subsurface is not so complex that it requires wave equation methods to form adequate images.
In one embodiment, the invention is a method for migrating 3D seismic data to create depth images of reflector surfaces in a subsurface region where azimuth information at each image point is desired for petroleum exploration or production, said method comprising performing steps (a)-(c) one data trace at a time:
(a) for each combination of the trace's corresponding seismic source and receiver locations and an image point, using a ray-based imaging method to determine direction angles at the image point of a first seismic ray connecting the source to the image point and of a second seismic ray connecting the receiver location to the image point;
(b) geometrically determining mathematical relationships from which azimuthal angle at the image point of a plane defined by each first and second seismic ray pair can be solved knowing the ray direction angles; and
(c) migrating the seismic data trace into data volumes labeled by a common azimuthal angle of the rays at each image point.
The present invention and its advantages will be better understood by referring to the following detailed description and the attached drawings in which:
The invention will be described in connection with example embodiments. However, to the extent that the following description is specific to a particular embodiment or a particular use of the invention, this is intended to be illustrative only, and is not to be construed as limiting the scope of the invention. On the contrary, it is intended to cover all alternatives, modifications and equivalents that may be included within the scope of the invention, as defined by the appended claims.
The Common Reflection Angle Migration (“CRAM”) approach to imaging disclosed in U.S. Pat. No. 7,095,678 is particularly well suited to the class of imaging problems described above (in the “Background” section). This is because a key feature of CRAM is that, given a velocity model (step 41 in the flow chart of
As described by U.S. Pat. No. 7,095,678, ray direction unit vectors {circumflex over (n)}10, {circumflex over (n)}20 give the directions of each ray at the surface while ray direction unit vectors {circumflex over (n)}1, {circumflex over (n)}2 give the ray directions at the image point. Herein, all symbols that have a caret (̂) appearing over them refer to unit vectors. The unit dip vector {circumflex over (n)} bisects the angle between {circumflex over (n)}1 and {circumflex over (n)}2, and its components may be referred to as the dip, or dip direction, corresponding to the ray pair and image point 13. The colatitude angle θ and longitude angle φ specify the Cartesian components of {circumflex over (n)} in the standard way:
{circumflex over (n)}x=sin θ cos φ
{circumflex over (n)}y=sin θ sin φ
{circumflex over (n)}z=cos θ (1)
The angle α is the reflection angle and the angle ψ is the azimuth angle. As stated in U.S. Pat. No. 7,095,678: “The angle ψ around the rotation axis defined by {circumflex over (n)} determines the orientation of the plane defined by the rays at the image point. In forming the seismic image the angle ψ is usually summed over, which can be accomplished by ignoring it in the kernel. However, if ψ is computed in the kernel, it is also possible to produce seismic volumes that depend on both ψ and the reflection angle α.” The present invention is a method for doing this.
The angle α can be computed from the equation:
cos(2α)={circumflex over (n)}1·{circumflex over (n)}2 (2)
Vectors {circumflex over (n)} and {circumflex over (m)} can be found from:
{circumflex over (n)}=({circumflex over (n)}1+{circumflex over (n)}2)/(2 cos α) (3)
{circumflex over (m)}=({circumflex over (n)}2−{circumflex over (n)}1)/(2 sin α) (4)
Vectors {circumflex over (n)} and {circumflex over (m)} are therefore mutually perpendicular and are coplanar with {circumflex over (n)}1 and {circumflex over (n)}2. The vector {circumflex over (m)} is related to angle ψ as explained below.
R(ψ,θ,φ)=Rz(ψ)Ry(θ)Rz(φ) (5)
The initial configuration has vectors {circumflex over (n)}1 and {circumflex over (n)}2 in the x-z plane each making an angle α with the z-axis along which {circumflex over (n)} is pointed. The succession of rotations of the coordinate axes in equation (5) corresponds to the “y-convention” described at greater length by Goldstein (Classical Mechanics, Addison-Wesley, 147 (1981)). That is, the rotations are, in order, around the z-axis by an angle φ, followed by rotation around the new y-axis by an angle θ, followed by rotation around the new z-axis by an angle ψ. The vector {circumflex over (n)} points along the final z-axis while the vectors {circumflex over (l)} an {circumflex over (k)} point along the x and y-axes after the second rotation Ry(0). The vectors {circumflex over (z)}, {circumflex over (n)} and {circumflex over (l)} lie in a plane that intersects the x-y plane in a line defined by the unit vector {circumflex over (λ)}. The vectors {circumflex over (n)} and {circumflex over (m)} define a plane that meets the x-y plane in a line defined by the vector {circumflex over (μ)}. The vector {circumflex over (μ)} defines the azimuthal direction of the reflecting rays relative to a fixed direction in space, taken here as the x-axis. The angle ε is defined by:
cos ε={circumflex over (x)}·{circumflex over (μ)} (6)
This angle coincides with the angle φ defined by Biondi (Biondo Biondi, 3D Seismic Imaging, Society of Exploration Geophysicists, Ch. 6 (2006)). The angle ψ is the azimuthal angle relative to the dip direction of the imaged reflector.
The unit vectors {circumflex over (l)} and {circumflex over (k)}are related to angles θ and φ:
{circumflex over (l)}=(cos θ cos φ,cos θ sin φ,−sin θ) (7)
and,
{circumflex over (k)}=(−sin φ,cos φ,0) (8)
One way to compute the angle ψ is from the simultaneous equations:
The azimuthal angle ε can be computed from the ray directions as:
Equation (10) is equivalent to a formula of Biondi and Palacharla (Geophysics 61, 1822-1832 (1996)) and Biondi (3D Seismic Imaging, Ch 6, Society of Exploration Geophysicists (2006)). However, these references present it in a wave equation imaging context instead of the ray based imaging context of the present invention. The methods described in the 2006 Biondi reference are focused on downward continuation imaging methods, which are much more time consuming and expensive than the ray based imaging methods used in the present invention. Chapter 6 gives various formulas and comments based on wave equation imaging without disclosing how to process seismic data to produce common azimuthal angle sections. Other examples of a common azimuth downward continuation method include U.S. Pat. No. 6,778,909 to Popovici et al.; and Prucha et al., SEP (Stanford Exploration Project) Report 100, pp 101-113 (1999). Only reflection angles are considered. Azimuth angles are treated only with the assumption that azimuth is constant in depth, which is not generally true in depth imaging.
The angle ψ can be most efficiently computed as:
where θ and φ can be calculated from equations (1).
For interpretation of the fracture angles in seismic data both angles ε and ψ may be required, depending on the complexity of the fracture system under investigation. This is because the angle ε refers to the azimuthal angle relative to a fixed direction in space, in this case relative to the x-axis. The angle ψ refers to the azimuth relative to the direction of dip of the reflector. Both fracture patterns are found in fractured rocks in real world geology.
These formulas apply to the case of P-P reflection imaging. For the case of P-S imaging which is also important for investigating fractures (since S-waves are more sensitive to fractures than P-waves), all of the above formulas apply except for the definitions of vectors {circumflex over (m)} and {circumflex over (n)} which have to be redefined in terms of {circumflex over (n)}1 and {circumflex over (n)}2 as shown in
First the total reflection angle α+β is calculated by:
cos(α+β)={circumflex over (n)}1·{circumflex over (n)}2 (12)
Then the individual angles α and β are computed from:
where vS and vP are respectively the S- and P-wave velocities at the image point.
With this information the reflector normal can be constructed as:
The unit vector {circumflex over (m)} that describes (through its rotation around the normal {circumflex over (n)}) the azimuth angle ψ at the reflection point is in the plane of the reflector and is:
The angle ε can be computed from equation 10. The angle ψ can be computed from equations 1 and 11. Alternatively, equations 1, 10, and 11 can be used.
As explained in the previous section, the best way to implement migration into common azimuth datasets is to first compute one-way ray maps that contain at a minimum (see step 43 in
(1) travel times
(2) dip values at the target locations
Normally, (as explained in U.S. Pat. No. 7,095,678) the ray maps used in CRAM would also contain amplitudes, KMAH indices and dip vectors at the source locations. As explained in the previous section the angles α, ψ, and ε can be computed from {circumflex over (n)}1 and {circumflex over (n)}2. This applies for both P-P and P-S imaging. The unusual case of S-P imaging is the same as P-S imaging with source and receiver exchanged, while the case of S-S imaging is similar to the case of P-P imaging with S-wave velocities substituted for P-wave velocities. Thus far herein, only isotropic media have been explicitly considered; however anisotropic media can be dealt with in the same way.
Koren et al. describe a local angle domain (“LAD”) for use in seismic imaging. (Paper 297, EAGE 69th Conference & Exhibition, London, Jun. 11-14, 2007) Their LAD is a system of four angles defining the interaction between incident and reflected waves at a specific image point. Two angles represent the spatial direction of the ray-path normal: its dip and azimuth. The third angle is the half-opening angle between the incident and reflected rays. The fourth angle is the azimuth of the ray-pair plane measured in the ray-pair reflection surface. In U.S. Patent Application Publication No. 2008/0109168 (May 8, 2008), Koren and Ravve use the LAD angles in angle-domain imaging of seismic data. They map the seismic data set to a second data set of lower dimensionality, and then image the second set of data. This approach is computer intensive, and may be impractical for 3D seismic data sets. In contrast, the present inventive method reads in a data trace, computes the reflection and azimuth angles on the fly using stored dip information as explained in detail in the CRAM patent (U.S. Pat. No. 7,095,678), and migrates that trace before the next data trace is read into the computer. This results in an advantageous savings of computer time and resources.
The method for performing migration in the present invention is preferably but not necessarily CRAM. For example, the seismic data may be migrated into common offset data volumes, common shot volumes, or common receiver volumes. (Step 44 in
It will be understood by those skilled in the art that the methods described herein enable migration into volumes that are labeled by azimuth and/or reflection angle in any way convenient for the end user. This is because determining the angles 60 , ψ and/or ε on the fly in the migration kernel makes it possible to “scatter” the migration output into volumes appropriately labeled by α, ψ and/or ε.
The foregoing application is directed to particular embodiments of the present invention for the purpose of illustrating it. It will be apparent, however, to one skilled in the art, that many modifications and variations to the embodiments described herein are possible. All such modifications and variations are intended to be within the scope of the present invention, as defined in the appended claims.
This application claims the benefit of U.S. Provisional application 61/095,013 which was filed on Sep. 8, 2008.
Number | Date | Country | |
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61095013 | Sep 2008 | US |