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GB2482085A - Generating a plot which represents locations of changes in the underlying geology of a region based on gravity gradient survey data - Google Patents

Generating a plot which represents locations of changes in the underlying geology of a region based on gravity gradient survey data Download PDF

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GB2482085A
GB2482085A GB1118371.2A GB201118371A GB2482085A GB 2482085 A GB2482085 A GB 2482085A GB 201118371 A GB201118371 A GB 201118371A GB 2482085 A GB2482085 A GB 2482085A
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data
potential field
spatial features
processing
lines
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Mark Davies
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Arkex Ltd
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    • GPHYSICS
    • G01MEASURING; TESTING
    • G01VGEOPHYSICS; GRAVITATIONAL MEASUREMENTS; DETECTING MASSES OR OBJECTS; TAGS
    • G01V3/00Electric or magnetic prospecting or detecting; Measuring magnetic field characteristics of the earth, e.g. declination, deviation
    • G01V3/38Processing data, e.g. for analysis, for interpretation, for correction
    • GPHYSICS
    • G01MEASURING; TESTING
    • G01VGEOPHYSICS; GRAVITATIONAL MEASUREMENTS; DETECTING MASSES OR OBJECTS; TAGS
    • G01V7/00Measuring gravitational fields or waves; Gravimetric prospecting or detecting
    • G01V7/02Details
    • G01V7/06Analysis or interpretation of gravimetric records

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Abstract

A method and system for processing geophysical data including at least measured gravity gradient data from surveyed region of the earth comprises inputting the gravity gradient data comprising a plurality of tensor components for said surveyed region; processing said data to identify a plurality of sets of line spatial features, said spatial features corresponding to locations of changes in said underlying geology and with each set of spatial features corresponding to a different tensor component of the gravity gradient data; determining a degree of correlation between each of said sets of spatial features, and generating plot data providing a representation of said degree of correlation on a set of lines representing said line spatial features to identify said locations of said changes to thereby represent said underlying geology of said surveyed region. The method may additionally comprise inputting other potential field data.

Description

Geophysical Data Processing Systems
FIELD OF THE INVENTION
This invention relates to methods, apparatus, and computer program code for processing geophysical data, more particularly potential field data from a potential field survey to provide a representation of the underlying geology of the surveyed region.
Embodiments of the techniques we describe are particularly useful for processing data from airborne surveys, in particular gravity field surveys.
BACKGROUND TO THE INVENTION
In this specification we will refer to airborne surveys, and more particularly to gravity gradient surveys. However the techniques we describe are not limited to these types of survey and may be applied to other potential field surveys including, but not limited to, gravity surveys, magnetic field surveys such as magnetotelluric surveys, electromagnetic surveys and the like.
A potential field survey is performed by measuring potential field data which, for a gravity survey, may comprise one or more of gravimeter data (measuring gravity field) or gravity gradiometer data (measuring gravity field gradient), vector magnetometer data, true magnetic gradiometer data, and other types of data well-known to those skilled in the art. A common aim of a geophysical potential field survey is to search for signatures which potentially indicate valuable mineral deposits.
Fli2ht Surveys Conventionally airborne potential field surveys such as gravity surveys are flown on a grid pattern. The grid is defined by orthogonal sets of parallel lines (flight paths) on a two-dimensional surface which is draped over the underlying telTain. However the draped surface is constrained by the closest the aircraft is permitted to fly to the ground and the maximum rate of climb/descent of the aircraft. Some improved techniques for airborne potential field surveys, which facilitate the collection of data from close to the ground, are described in the applicant's co-pending PCT patent application "Gravity Survey Data Processing", PCT/GB2006/050211, published as W02007/012895, hereby incorporated by reference in its entirety.
Data Conditionin2 The term levelling is used in the art as a generic term to cover conventional techniques for data conditioning. These techniques include removal of low frequency drift, matching low frequency content of neighbouring lines, and referencing data to a fixed height place. For example the intersection points of a standard gridded survey can be used for cross-over levelling, where the data along survey lines are adjusted to minimise differences at these points. We have described some improved techniques for handling of noise in our UK patent application no. 0701725.4 filed on 30 January 2007, hereby incorporated by reference in its entirety.
Terrain Correction After the potential field data has been collected but prior to interpreting the data a terrain correction is generally applied, compensating for surface height variations.
Surface data may be purchased in the fonii of digital terrain elevation data or determined from (D)GPS ((Differential) Global Position System) and/or airborne techniques such as LIDAR (Laser Imaging Detection and Ranging) and SAR (synthetic aperture radar). Aircraft acceleration, attitude, angular rate and angular acceleration data may also be used to correct the output data of the potential field instrumentation.
We describe some improved techniques for terrain correction in geophysical surveys in our co-pending UK patent application "Terrain Correction Systems", no. 0601482.3, filed 25 Jan 2006, published as GB2435523, also hereby incorporated by reference in its entirety. Another technique, described in WO 03/0320 15, corrects measurements from geophysical instruments in real time at source from other navigation and mapping instruments carried by the aircraft. A further particularly advantageous technique using time-domain correction data to provide terrain corrected measured potential field data for mapping of a field is described in our co-pending UK patent application no. 0705605.4 filed on 23 March 2007, also hereby incorporated by reference in its entirety.
There remains a need, however, for improved techniques for processing geophysical data from such surveys in order to identify the underlying geology.
SUMMARY OF THE INVENTION
According to a first aspect of the invention there is therefore provided a method of processing geophysical data including at least measured potential field data from a potential field survey of a surveyed region of the earth to provide a three-dimensional representation of the underlying geology of said surveyed region, the method comprising: inputting terrain-corrected potential field data for said surveyed region, said potential field data comprising data for a range of spatial wavelengths, geological features at different depths in said surveyed region being associated with different wavelengths in said range of wavelengths; filtering said potential field data by spatial wavelength to generate a first plurality of filtered sets of potential field data, each relating to a respective wavelength or range of wavelengths, each targeting geological features at a different respective said depth; processing each said filtered set of potential field data, to identify a set of spatial features comprising one or both of line spatial features and point spatial features in each said filtered set of potential field data, and to generate a set of plot data for each said filtered set of potential field data, a said set of plot data representing said identified set of spatial features for a said depth targeted by said filtering; and combining said sets of plot data to generate three-dimensional map data providing a three-dimensional representation of said underlying geology of said surveyed region.
In some prefened embodiments of the method the potential field data comprises measured gravity and/or gravity gradient data, although other potential field data such as magnetic data may additionally or alternatively be employed and, similarly, other quantities derived from spatial derivatives of the potential field may additionally or alternatively be measured. In preferred embodiments the potential field survey is conducted from a moving platform such as an aircraft.
In embodiments, in particular where the field comprises a gravity field, the processing to identify spatial features comprises identifying one or more of maxima, minima and points/lines of inflection in the filtered potential field data. Thus, for example, with the gravity gradient tensor the on-diagonal components and (which are differential signals) are processed to determine inflection points or changes in slope since these generally correspond to geologically significant features of the surveyed region such as an interface between two different types/densities of rock. For off- diagonal components, in particular and (which emphasise symmetries in the x-and y-direction respectively, maxima and/or minima are preferably identified; for points are preferably identified by locating pairs of dipoles since these tend to identify corners of a subterranean body. Off-diagonal elements (where i is x or y) tend to emphasise symmetries in the i-direction. On-diagonal components and G are always zero along respective axis x=O and y=O and since the choice of axis is often arbitrary, optionally the co-ordinates system may can be rotated about one or more axis to potentially identify further geologically useful information. In embodiments the co-ordinate axis may be selected to maximise the apparent useful geological information.
Similarly magnetic data may be processed to identify maximumlminimum inflection points/lines.
In embodiments of the method, although filtering by wavelength targets the filtered potential field data at a particular depth, nonetheless within the filtered potential field data different spatial features for example identified using the afore-mentioned processing, may be associated with different depths, either because of the physical shape of the subtenanean feature, or because of a feature being associated with a more specific wavelength within the range, or both. In theory a buried object has a characteristic amplitude and wavelength at a given survey height, and this has a dependence on the shape of the object. Thus the precise depth associated with an underlying geological feature depends on the shape assumed for the feature. This may be provided by an approximate assumed model for the underlying geology since this information is usually available. Further the geometry of a fault or edge has a characteristic potential field signal, and this geometry may be assumed in processing the data set. In the case of a fault the filtered signal generally picks up the top of the fault (and so the edge of the fault can be tracked downwards by increasing the wavelength of the filter.
Thus in embodiments although a set of plot data comprising the identified spatial features has an associated targeted depth or depth range for the features, a feature will, in embodiments, also have an associated (more specific) depth. Thus the three-dimensional map, in embodiments, does not merely comprise a stack of flat maps but comprises a layered representation, spatial features within a layer having their own respective associated depths, for example assigned to a feature by wavelength and/or geometry. Embodiments of the technique may include inputting data for an assumed model for the underlying geology of the surveyed region, and this data may then be employed in determining the plot data for a set of spatial features, more particularly for determining estimated depths of spatial features identified from a filtered set of potential field data. The skilled person will understand that the plot data is used for generating a 3D plot map of the underlying geology but need not itself be plotted or otherwise output as an intermediate step (although it may be helpful). In general, however, the 3D map data will be output as a plot on a display or printer.
In general there will be a number of different sources of noise and uncertainty associated with the identified spatial features and thus, in some preferred embodiments of the method, "error bars" are added by dilating the representations of the spatial features, for example approximately in proportion to an estimated error. This dilation may also take account of the inherent lack of resolution resulting from the chosen spacing of the flight paths for the survey.
Referring again to the above-mentioned maxima, minima and lines of inflection, in some prefened embodiments of the method multiple sets of spatial features are identified for each wavelength-filtered set of potential field data, for example from different vector or tensor components of a surveyed gravity field, magnetic field or gravity gradient field and/or from survey data other than from a potential field survey.
This other survey data need not be targeted at specific depths. Then, in embodiments, the method further comprises determining a degree of correlation between the multiple sets of spatial features, to identify a degree of coherency between the spatial features.
For example in a simple implementation a degree of correlation may be measured by determining a degree of overlap when the spatial features are superposed. These multiple, correlated spatial features, in embodiments, significantly enhance the value of the geological information. In preferred embodiments the degree of correlation is represented in both the plot data from multiple correlated sets of spatial features and in the three-dimensional representation of the underlying geology either explicitly, by providing correlation value information for identified spatial features and/or implicitly for example by omitting features with less than a threshold level of correlation. When displayed the degree of correlation may be indicated by colour, for example using warm colours for a high degree of colTelation or coherency, and cold colours for a lower degree of correlation or coherency; brightness (high for high-correlation) may additionally or alternatively be employed. In some particularly preferred embodiments multiple sets of spatial features are generated from the filtered sets of potential field data, thus providing multiple sets of spatial features each targeted at substantially the same depth. As previously mentioned, these may be derived from different vector or tensor components of the surveyed potential field. When combined, this provides particularly useful geophysical/stratigraphic information. Other survey data which may be combined with the data obtained from a potential field survey includes (but is not limited to): topographic information, for example determined by lidar, spectral or more preferably hyperspectral imagery, gas saturation data, chemical analysis data (from soil sampling), and other soil survey data.
In some particularly prefelTed embodiments the method further comprises generating fault polygon data from the 3D representation of the underlying geology of the surveyed region. As the skilled person will understand, fault polygon data comprises data representing a location of one or more geological faults on a surface or horizon of the surveyed region. Such a fault polygon may be defined by a plurality of corner points and/or edges, in particular defining a loop, for example on the earth's surface. Such a fault polygon may thus define horizons of stratigraphic layers. Fault polygons are useful because it is generally undesirable to drill at the location of a fault because typically the geology changes to either side of a fault and thus by drilling through the fault one may miss the desired oil or mineral.
We have described above how multiple sets of spatial features may be combined and the degree of correlation between these determined. This technique itself provides useful geological information, which may be provided as what the inventors have termed a "ribbon coherency plot".
Thus in a related aspect the invention provides a method of processing geophysical data including at least measured potential field data from a potential field survey of a surveyed region of the earth to provide a representation of the underlying geology of the surveyed region as a set of lines, the method comprising: inputting potential field data for said surveyed region; processing said potential field data to identify spatial features comprising one or both of line spatial features and point spatial features, said spatial features conesponding to locations of changes in said underlying geology; determining a degree of conelation between said identified spatial features; and generating plot data providing a representation of said degree of conelation on a set of lines representing said line spatial features to identify said locations of said changes to thereby represent said underlying geology of said surveyed region.
Features of embodiments of the above-described first aspect of the invention may similarly be employed when generating a ribbon coherency plot".
The generation of one or more sets of ribbon coherency plots and the generation of a three-dimensional representation of the underlying geology of a surveyed region from such plots may be performed in separate steps.
Thus in a further related aspect the invention provides a method of processing geophysical data including at least measured potential field data from a potential field survey of a surveyed region of the earth to provide a three-dimensional representation of the underlying geology of said surveyed region, the method comprising: inputting geological spatial feature data derived from filtered potential field data, said filtered potential field data comprising data filtered by spatial wavelength to generate a plurality of filtered sets of potential field data each targeting geological features at a different respective depth in said surveyed region, said spatial feature data comprising data identifying a set of spatial features for each said targeted depth, a said set of spatial features comprising one or both of line spatial features and point spatial features; and combining said sets of spatial features for each said targeted depth to generate three-dimensional map data providing a three-dimensional representation of said underlying geology of said surveyed region.
The invention also provides a method of extracting oil or a mineral from the earth, the method including conducting a potential field survey according to an aspect or embodiment of the invention as described above to generate a representation of the underlying geology of the surveyed region, and then using this representation to extract the desired oil or mineral. A further aspect of the invention also provides oil or mineral extracted using this technique.
The invention further provides processor control code to implement the above-described methods, in particular on a data carrier such as a disk, CD-or DVD-ROM, programmed memory such as read-only memory (Firmware), or on a data canier such as an optical or electrical signal carrier. Code (and/or data) to implement embodiments of the invention may comprise source, object or executable code in a conventional programming language (interpreted or compiled) such as C, or assembly code, code for setting up or controlling an ASIC (Application Specific Integrated Circuit) or FPGA (Field Programmable Gate Array), or code for a hardware description language such as Verilog (Trade Mark) or VHDL (Very high speed integrated circuit Hardware Description Language). As the skilled person will appreciate such code and/or data may be distributed between a plurality of coupled components in communication with one another, for example distributed across a network.
The invention further provides a data processing system configured to implement embodiments of the above-described methods, to determine one or more parameters relating to physical properties of the Earth's interior from processed geophysical data.
Such a data processing system may comprise: data memory for storing measured potential field data and plot data for representing the underlying geology of the surveyed region, program memory storing processor control code as described above; and a processor coupled to said data memory and to said program memory to load and implement said control code.
BRIEF DESCRIPTION OF THE DRAWINGS
These and other aspects of the invention will now be further described, by way of example only, with reference to the accompanying figures in which: Figures la and lb show, respectively, an aircraft with flight survey data, and an example of a data processing system configured to implement an embodiment of a method according to the invention, and an example set of flight paths for an airborne
potential field survey;
Figure 2 shows a procedure for a computer programme to process potential field data to represent underlying geology in terms of correlation over a set of lines, according to an embodiment of an aspect of the invention; Figures 3a to 3d show, respectively, first and second perspective views, a vertical cross-sectional view, and boundaries and offsets of a model of a faulted subterranean body; Figures 4a to 4c show, respectively, modelled gravity component G for the subterranean body of Figure 3, and corresponding interpretation lines and dilated interpretation lines; Figures 5a to 5c show, respectively, plan and perspective views of for the subterranean body of Figure 3, and corresponding sets of interpretation lines; Figures 6a to 6c, show plan and perspective views of and added geological interpretation lines; Figures 7a to 7c, show modelled G for the subterranean body of Figure 3 and corresponding sets of lines of interpretation; Figures 8a to 8c show modelled for the subterranean body of Figure 3 and corresponding sets of geological interpretation lines; Figures 9a to 9c show modelled for the subterranean body of Figure 3, and corresponding sets of geological interpretation lines; Figures lOa to 10c show, respectively, plan and 3D perspective views of modelled for the subtenanean body of Figure 3, construction of points/lines of geological interpretation, and dilated points/lines to take account of error; Figures 1 la to lic show, respectively, a plan of modelled RTP magnetic field data for the subterranean body of Figure 3, construction of points/lines of geological interpretation, and dilated points/lines to take account of error; Figures 12a to 12d show, respectively, a plan view of overlying geological line spatial features, the spatial features dilated to represent predicted errors, a map of the geological line spatial features including representation of a degree of conelation between the features, and an overlay of the correlation map with the modelled subtenanean body from which they were generated; Figure 13 illustrates geological line spatial features including a representation of a degree of correlation/coherency for a real example of a surveyed region; Figure 14 illustrates a procedure for generating a three-dimensional representation of the underlying geology of a surveyed region according to an embodiment of the aspect of the invention; and Figures 15a and 15b illustrate, schematically, changes in measured potential field data with a depth of a geological feature.
DETAILED DESCRIPTION OF PREDERRED EMBODIMENTS
Potential field surveys
When we refer to a field, in particular a gravity field, this is not limited to a vector field but includes scalar and tensor fields, a potential field and any derivatives deriving from the potential field. Potential field data includes, but is not limited to, gravimeter data, gravity gradiometer data, vector magnetometer data and true magnetic gradiometer data.
Elements and representations of a potential field may be derived from a scalar quantity.
Consider an airborne potential field survey such as a gravity survey, flown on a grid pattern defined by orthogonal sets of parallel lines (flight paths) on a two-dimensional surface which is draped over the underlying terrain. When looking for underlying anomalies the nearby mass has a dominating effect and to provide an accurate representation of deep features a good representation of surface features is desirable so as to be able to perform terrain correction (as described above) by subtracting-off particularly the higher frequencies (which dominate the power spectrum). A signal with wavelength X falls off with height z as exp(-kz) where k 2ir/2 (from which it can be seen that longer wavelengths are less attenuated) and the wavelength scale corresponds to a signature expected given a target's size and depth.
For gravity, the relevant potential is the gravity scalar potential, (r), defined as (r) = 555 dr' where r, p(r'), G are respectively, the position of measurement of the gravity field, the mass density at location r, and the gravitational constant. The gravitational acceleration, which is how a gravitational field is experienced, is the spatial derivative of the scalar potential. Gravity is a vector in that it has directionality. It is represented by three components with respect to any chosen Cartesian coordinate system as: \ (i(r) cI(r) i(r) x y z Each of these three components varies in each of the three directions and the nine quantities so generated form the Gravity gradient tensor: ct(r) ct(r) cI(r) G..G G G= G G G = cI(r) ct(r) cI(r)
G G G
Z Zy ZZ ct(r) act(r) dt(r) Z X tZ y z z There is a relationship between the depth (and shape) of a buried object and the wavelength (and amplitude) of the detected signal. In general, a measured quantity -say a component of the gravity vector or of the gravity gradient tensor will be a summation of the form shown below. Here we use gg as notation for the measured quantity, for example caIcziIated ( = mmass_e,e,j,e,itF(rmeasure -rmass_eleme,it) all-masses In the above equation F is called a Greens function (see for example, R.J. Blakely, "Potential Theory in Gravity and Magnetic Applications", Cambridge University Press, 1995, at page 185, incorporated by reference) and Te1e,,,e,tt defines the location of the mass element (for example the centre of gravity or some other defined point).
The functions F are standard functions, essentially, the influence a source (mass element) of unity mass or density and defined shape would have at the relevant (measurement) point. The source may be a point source, sphere or ellipsoid but, in practice is more often a prism, which may be irregular. For example, if the presence of a particular geological layer or, say, geological anomaly, e.g. a kimberlite pipe, is suspected a shape can be defined to take account of this. A number of textbooks list Greens functions for simple shapes; functions for more complex source geometries can be found in the literature. Also the source influence superposes so that if a complex shape can be discretised into a plurality of simpler shapes then the Greens functions for the discrete shapes can be added together. This in principle allows numerical values for the Greens function of any arbitrary shape to be determined, although in practice relatively simple shapes are generally preferable. By way of example, the Green's function F for a rectangular prism (Blakely, ibid, at page 187), has 8 terms each of which corresponds to a vertex of the prism.
Referring now to Figure 1, this shows an example of an aircraft 10 for conducting a potential field survey to obtain data for processing in accordance with a method as described above. The aircraft 10 comprises an inertial platform 12 on which is mounted a gravity gradiometer 14, for example a full-tensor gravity gradiometer from Lockheed-Martin. The gravity gradiometer 14 provides potential field survey data to a data collection system 16. A particularly advantageous design of superconducting gravity gradiometer ("Exploration Gravity Gradiometer" -EGG) is described in the Applicant's The inertial platform 12 is fitted with an inertial measurement unit (IMU) 18 which also provides data to data collection system 16 typically comprising attitude data (for example, pitch, roll and yaw data), angular rate and angular acceleration data, and aircraft acceleration data. The aircraft is also equipped with a differential GPS system and a LIDAR system 22 or similar to provide data on the height of the aircraft above the underlying tenain. The aircraft 10 may also be equipped with other instrumentation 24 such as a magnetic gradiometer or magnetometer, TDEM system and/or hyperspectral imaging system, again feeding into the data collection system. The data collection system 16 also has an input from general aircraft instrumentation 26 which may comprise, for example, an altimeter, air and/or ground speed data and the like. The data collection system 16 may provide some initial data pre-processing, for example to correct the LIDAR data for aircraft motion and/or to combine data from the IMU 18 and DGPS 20. The data collection system 16 may be provided with a communications link 16a and/or non-volatile storage 16b to enable the collected potential field and position data to be stored for later processing. A network interface (not shown) may also be provided.
Figure lb shows examples of flight survey paths, data from which can be processed by the techniques we have previously described in "Gravity Survey Data Processing", PCT/GB2006/05021 1 (W02004/0 12895).
Data processing to generate plot data from the potential field survey to provide a 3D representation of the underlying geology of the surveyed region is generally (but not necessarily) canied out offline, sometimes in a different country to that where the survey data was collected. As illustrated a data processing system 50 comprises a processor 52 coupled to code and data memory 54, an input/output system 56 (for example comprising interfaces for a network and/or storage media and/or other communications), and to a user interface 58 for example comprising a keyboard and/or mouse. The code and/or data stored in memory 54 may be provided on a removable storage medium 60. In operation the data includes data collected from the potential field survey and the code comprises code to process this data to generate 2D/3D geological map data in accordance with the procedure described below.
Potential field survey data processing
We now describe techniques for processing data from a potential field survey to extract a representation of the underlying geology. We first describe a technique for generating linear representations of the underlying geology, with reference to the procedure of Figure 2.
Referring to Figure 2, an input to the procedure comprises measured potential field data, preferably including gravity data, gravity gradient data, and RTP (reduced-to-pole) magnetic data as well as optionally, additional survey data such as lidar data, hyperspectral image data, soil analysis data and the like. The potential field survey data has associated 3D position data defining a location on the earths surface and a height above the earth's surface for each measurement (other survey data may only have 2D position information). Preferably the potential field data is provided to the procedure after terrain correction as described above, although optionally this may be performed as part of the procedure illustrated in Figure 2.
Preferably, although not essentially, the procedure then filters the potential field data by spatial wavelength to target geology at different depths (step 201).
Then, at step 202, the procedure processes vector gravity field components G, G and G to determine line features and then dilate the determined interpretation lines to represent an approximate error margin, for example 100 metres. An estimate of this error margin may be determined, for example, from the separation of the flight lines optionally with an additional amount put in "by hand to account for inherent noise in the instrumentation and possibly expected false positives arising from anomalous geology. Although not essential, it is preferable that all the gravity field components are employed, to maximise the information on which a determination of the geology is being made.
It is helpful at this stage, to aid understanding of embodiments of the invention, to illustrate processing of the various vector and tensor components of the measured, terrain corrected potential field. This is conveniently done using a model of a faulted subterranean body as shown in Figures 3a to 3d. Thus figures 3a and 3b (in which the scales are in metres) show first and second 3D perspective views of the surface of a faulted subterranean body of dimensions 16 km by 16 km by 300 metres high, and Figure 3c shows a 2D vertical cross section through the body of Figures 3a and 3b showing the different rock types and densities in g/cm2. Figure 3d illustrates the boundaries of the subterranean body in map view and "offsets" of the subterranean body, also in map view, such as may be caused by, for example, strike slip faults along the horizontal dotted lines.
Referring next to Figure 4, this illustrates processing of (modelled) gravity component G, Figure 4a illustrating modelled G in plan and 3D perspective view. To process a gravity signal such as G interpretation lines 400 are added as illustrated in Figure 4b, for example by identifying lines of inflection in the signal (that is where the radius of curvature goes from positive to negative or vice versa). Preferably these interpretation lines are then buffered to a margin of error to generated dilated lines 400a as shown in Figure 4c. Optionally the degree of dilation may be adjusted by a user on a project-by-project basis.
Referring again to Figure 2, the procedure next processes (step 204) gravity gradient components and again to determine lines for interpreting the underlying geology. Thus refening to Figure 5a, this shows, in plan and perspective views, for the subterranean body of Figure 3. In Figure 5b this data has been processed to identify points/lines of inflection 500, and in Figure 5c these have been dilated 500a to represent errors. Preferably a single dilation value is used for all the interpretation lines -that is in embodiments of the method the widths of the interpretation lines derived from different potential fields/potential field components are substantially the same. As can be seen, the signal provides a sharper representation of the subtenanean body than G. Figures 6a to 6c illustrate processing of the signal to generate interpretation lines 600, enlarged 600a to take account of errors. Broadly speaking the signal picks out edges in the y direction, points/lines of inflection 600, 600a representing these edges.
The skilled person will understand that the choice of rotation of the x-y axis is arbitrary and, optionally, these axis may be rotated to determine whether features of particular geological interest become more apparent.
Figure 7a shows plan and perspective views of G in which points/lines of inflection pick out edges in the x direction (in a complementary manner to Figures 7b and 7c show interpretation lines 700, dilated 700a to take account of errors. Again the x-y axis may be rotated to search for features of particular geological interest.
Referring again to Figure 2, at step S206 the procedure then processes gravity gradient components and in these cases to identify points/lines defining maxima or minima (closely spaced maxima/minima may be joined to form lines). Broadly speaking the and tensor components emphasise Figures 8a to 8c show plan and perspective views of and corresponding lines of interpretation 800, 800a, and Figures 9a to 9c show plan and perspective views of and corresponding lines of interpretation 900, 900a.
Referring again to Figure 2, at step 206 the procedure processes to determine point/line features and dilates these to represent errors, as previously described. Figure lOa shows plan and perspective views of for the modelled subtenanean body of Figure 3; the procedure processes this data to identify maxima/minima points 1000, l000a and, preferably, also adds lines 1002 between these points to locally divide maxima from minima. Such a trend line is preferably only added when there is greater than a threshold difference between the maximum and an adjacent minimum. This is because the signal tends to pick out the corners of a subterranean body. As shown by the inset in Figure lOb, the maxima/minima tends to appear as pairs of dipoles separated by lines of zero signal and if desired, the ratio lengths A:B illustrated can be used to estimate the sharpness of a corner of an extended body whilst the separation C (or C') between minima (or maxima) is proportional to the depth of the ("corner") feature.
As previously mentioned, preferably all the gravity gradient tensor components are employed, to make best use of the available information. Preferably, where available, the procedure then continues to process (step 208) RTP magnetic data, and optionally other survey data where available, again to identify point/line features representing the underlying geology of the surveyed region. Thus Figure 11 a shows the modelled RTP magnetic field for the subterranean body of Figure 3 and Figure 1 lb shows the data of Figure 1 la with trend lines 1100 added by identifying significant longitudinal features.
(As can be seen in Figure 1 ib, the trend lines have been added where maxima/mimima above a threshold can be identified; these trend lines have been "quantised" in the sense that, for clarity, lengths below a threshold length are not permitted and, optionally, where a trend feature is identified a length may be extended for clarity and/or truncated with hysteresis by comparison with a threshold significance of a maximumlminimurn inflection). Again preferably the lines are dilated 1 lOOa to account for errors, as previously described, as illustrated in Figure 1 Ic. For hyperspectral and other survey data the skilled person will understand that similar techniques to those described above may be implemented to identify points/lines of maxima/minirnalinflection, for combination with spatial features identified from potential field survey data, as described further below.
Once a plurality of sets of spatial features have been identified, for example as described above, the procedure then combines (at step 210) this data and determines a degree of correlation or coherency between the available sets of spatial features, in particular from the tensor components of the gravity gradient data and from the vector components of the gravity field and/or magnetic data. The skilled person will understand that there are many different ways in which to determine the degree of correlation between different sets of spatial features. For example in a simple approach the spatial feature are superposed upon one another in a common, georeferenced set of coordinates and then regions of overlap are graded or colourised according to how many lines overlap one another. In embodiments warm (orange/red) colours may be used to represent areas where many interpretation lines overlap at a specific location and cool colours (blues) may be used to represent areas where few or none of the dilated geological interpretation lines cross one another. Alternatively greyscale graduation may be employed or contour lines or numbers used to represent the degree of correlation or coherence. From this the skilled person will understand that the order in which the various vector and tensor components of the potential field data are processed to obtain spatial features does not matter.
The identified point/line spatial features denote locations of geological change, for example structural or stratigraphical change. Figure 12a shows that some value can be obtained from a simple superposition or overlay in plan view of the geological lines of interpretation, even when these are not dilated to account for errors but Figure 12b shows that when these lines are dilated or "buffered" the representation is less clear.
Figure 12c shows a plot representing a degree of coherency determined by counting overlapping lines as described above. Figure 12d shows the coherency plot superposed on a plan or map view of the modelled subterranean body shown in Figure 3d, illustrating that this representation provides an accurate depiction of the underlying geology, the warmest colours (red and orange) picking our the corners of the body and the tepid colours (yellow and light green) identifying the edges of the body.
Although the plot data represents the degree of correlation on a set of lines representing the identified spatial features ("ribbon coherency plot") need not be displayed explicitly but may be further processed to represent the degree of coherence as a graduated (for example colourised) or contoured surface over the surveyed region. Thus at step 212 although the procedure may output a ribbon coherency plot, in embodiments areas of the (2D) map which contain high concentrations of warm colours may be demarcated with a frame such as a box denoting an area of interest. In embodiments, depending on the concentration of the warm colours, the boxed or framed areas are divided into primary and secondary areas of interest. With such a representation it can be helpful to also provide a coherency surface, that is a surface which is contoured according to the determined degree of correlational coherency between the identified spatial features. In still other embodiments the degree of coherency may be represented on a grid, either as contours or warmlcool colours.
Figure 13 shows an example ribbon coherency plot derived from real geological data.
As can be seen a result of processing as described above comprises a set of connected ribbons of tepid/warm colours defining lines on a plan view of the survey region indicating locations of geological change. In embodiments the procedure may use this data to determine and display a fault polygon mesh (step 214 in the procedure of Figure 2) by constructing polygons over complete or almost-complete loops formed by the ribbons of coherency. These are useful in dernarking regions avoid when drilling for exploration (because the underlying geology varies either side of a fault, hence drilling does not clearly sample a particular geological region).
The procedure of Figure 2 may be embodied as computer program code on a carrier 250. In embodiments the steps in the procedure of Figure 2 may be implemented using any one of a range of conventional geographic information system (GIS) tools well known to those skilled in the art. In embodiments the processes to generate point/line spatial features may involve interaction with a skilled user in order to take account of human expertise. Some techniques which have been found to be particularly useful for identifying point/line spatial features, in addition to those described above, are: for treating the data as representing fluid levels and allowing these levels to flow, identifying the flow direction and allowing flows to accumulate detect edges (using watershed software); and for determining eigenvalues.
We now describe a technique, related to the above-described processing, for determining a three-dimensional representation of the underlying geology of a surveyed region. Broadly speaking embodiments of the technique determine a degree of correlation/coherency between spatial features at different targeted depths to trace the underlying geology and, in particular, provide a representation of corner/edges, surfaces between regions of different geological composition. Thus, in embodiments, the potential field data is filtered by wavelengths to generate a set of quasi two-dimensional maps (2.5d maps), preferably at least 10 maps, for example between 50 and 100 maps, one per filtered wavelength. The maps are 21/2 dimensional" because a map derived by filtering by wavelength itself has a limited range of depth information and is therefore not "flat".
Thus referring to Figure 14, at step 1400 the procedure inputs potential field data with associated 3D measurement position data, preferably pre-processed for terrain correction (although this may alternatively be implemented in the procedure as illustrated in step 1400a). Then at step 1402 this potential field data is filtered by wavelength (step 1402) to determine a plurality of sets of filtered potential field data, for example between 50 and 100 sets of filtered data, each targeted at a respective depth.
Each set of wavelengths/filtered data is then processed according to the procedure of Figure 2 between points A and B to determine plot data representing a degree of correlation/coherency between the identified spatial features and the respective target depths for the filtered wavelength or wavelength band (step 1404). (As described previously other survey data may also be included in the conelation, for example hyperspectral imagery, soil survey data and the like).
The procedure then combines the spatial feature data from the different filtered wavelengths (step 1406) to generate data for a stack of 2.5D maps, each comprising a ribbon coherency plot as described above, but preferably with associated depth information for the identified point/line spatial features and hence correlations. This information may be further combined (step 1408) to determine correlation/coherency between maps of different levels. The skilled person will understand that correlation between identified spatial features may be performed prior to generating the stack of 2/2.5D maps or, alternatively, the degree of correlation/coherency between the identified spatial features may be performed in three dimensions without any intermediate step of generating correlations in 2/2.5D. Once the 3D data has been generated the 3D map of the underlying geology may be represented using any of a range of commercially available visualisation tools, for example.
An arbitrary surface or horizon may be defined in this three-dimensional data (this surface may be an approximation to the topographic surface of the earth) and then a fault polygon mesh defined on this surface, as described above (step 1410). However because three-dimensional data is available this concept may be extended to define fault surfaces and/or three-dimensional fault polygons representing the three-dimensional surface of a fault beneath the surveyed region. This may be performed, for example, by translating the height (depth) of a plane through the 3D region and constructing a 2D polygon mesh on each suiface, the height (depth) translated edges of the 2D polygons defining surfaces of 3D fault polygons.
The procedure of Figure 14 is preferably implemented using computer program code on a carrier such as carrier 1450. Again this code may be implemented using commercially available geographic information system code as previously described. In embodiments the software may also provide for expert user interaction to identify/modify spatial features for the above-described procedure.
Figure 1 5a illustrates, schematically, the change in amplitude and spatial frequency of a measured potential field (gravity gradient) signal with increasing depth of a geological feature from A to B. The precise shape of the measured potential field depends upon the shape of the underlying geology although a constraint on maximum depth may also be applied, whatever the shape of the geological feature. As the skilled person will be aware, there are several different algorithms which may be employed to estimate the depth of a geological feature based upon the measured potential field (and vice versa).
Figure 15b illustrates the operation of the wavelength filtering of the procedure of Figure 14, showing a fault and a point of inflection marked X. As the potential field data (e.g. gravity gradient) is filtered to remove shorter wavelengths the inflection point moves in the direction of the arrow (and the amplitude drops), tracking the fault downwards (the error also increases and optionally, the dilation of the identified spatial features may also be increased with increasing targeted depths to take account of this).
It can be seen, from Figure 15b, that filtering by wavelength can target different geological depths, and from Figure 15a that for a given targeted depth, depth information for an identified spatial feature more precisely specifying the depth of the feature is available. The combination of these two types of information is particularly advantageous for identifying fault polygons in three dimensions since, for example, for the fault illustrated in Figure 15b, both the top and bottom edges of the fault may be identified and the fault's shape in three dimensions may be ascertained.
The skilled person will appreciate that embodiments of the technique we describe are useful in identifying geological features of potential oil/mineral value, and can also be employed to trace one or more fault planes in 2D or 3D space, which is particularly helpful for exploratory drilling.
No doubt many other effective alternatives will occur to the skilled person. It will be understood that the invention is not limited to the described embodiments and encompasses modifications apparent to those skilled in the art lying within the spirit and scope of the claims appended hereto.

Claims (10)

  1. Claims 1. A method of processing geophysical data including at least measured gravity gradient data from a potential field survey of a surveyed region of the earth to provide a representation of the underlying geology of the surveyed region as a set of lines, the method comprising: inputting gravity gradient data comprising a plurality of tensor components for said surveyed region; processing said gravity gradient data to identify a plurality of sets of line spatial features, said spatial features conesponding to locations of changes in said underlying geology and with each set of spatial features corresponding to a different tensor component of said gravity gradient data; determining a degree of colTelation between each of said sets of spatial features; and generating plot data providing a representation of said degree of correlation on a set of lines representing said line spatial features to identify said locations of said changes to thereby represent said underlying geology of said surveyed region.
  2. 2. A method as claimed in claim 1 wherein said processing to identify spatial features comprises processing to identify one or more of maxima, minima and lines ofinflection in said potential field data.
  3. 3. A method as claimed in claim 1 or 2, comprising inputting other potential field data, wherein said identifying of said spatial features comprises identifying a set of spatial features from different types of said potential field data, and wherein said determining of said degree of conelation comprises determining a degree of conelation between said sets of identified spatial features identified from said different tensor components of said gravity gradient data or from said different typesof said potential field data.
  4. 4. A method as claimed in claim 1, 2 or 3 wherein said generating of said plot data further comprises dilating said spatial features to represent an error in saidpotential field data.
  5. 5. A method as claimed in any one of claims 1 to 4 further comprising filtering said potential field data by spatial wavelength to target geological features at a depth or range of depths selected by said filtering prior to said processing of said potentialfield data to identify said spatial features.
  6. 6. A method of extracting oil or a mineral from the earth, the method comprising conducting a potential field survey of a region, using the method of any one of claims 1 to 5 to process data from said potential field survey to generate a said representation of said degree of conelation to thereby represent said underlying geology of said surveyed region, and extracting said oil or mineral using said representation.
  7. 7. A canier carrying processor control code to, when running, implement the method of any preceding claim.
  8. 8. A geological data processing system for processing geophysical data including at least measured potential field data from a potential field survey of a surveyed region of the earth to provide a representation of the underlying geology of said surveyed region, the system comprising: data memory for storing said potential field data and data for representing said underlying geology; program memory storing the processor control code of claim 7; and a processor coupled to said data memory and to said program memory, to load and implement said processor control code.
  9. 9. A method of processing geophysical data as hereinbefore described, with reference to and as illustrated, in Figures 2 to 13.
  10. 10. A system for processing geophysical data as hereinbefore described, with reference to and as illustrated, in Figure 1.
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WO2016028189A1 (en) * 2014-08-18 2016-02-25 Геннадий Алексеевич ПЕТРЕНКО Method and apparatus for remote gravimetric sounding
RU2581076C2 (en) * 2014-08-18 2016-04-10 Геннадий Алексеевич Петренко Method and device for remote gravimetric probing

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