Annual Report 2000 - WIT

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70 By our numerical analysis, we have confirmed that demodeling can indeed be used for migration purposes. In all our experiments, demodeling correctly positioned the reflector in depth. Concerning amplitudes, demodeling presents positive as well as negative properties. Positively is to be noted that, under ideal circumstances, demodeling recovers the reflection coefficients along the reflecting interface with very small errors. Boundary zones can be kept smaller than in Kirchhoff migration. Random noise does not affect demodeling amplitudes any more than it does Kirchhoff migration. Off the reflector, the noise level is reduced by demodeling. As a negative quality of demodeling, its bad amplitude recovery in the presence of caustics is to be cited. From an implementational point of view, we want to stress the following differences between Kirchhoff migration and demodeling. Because of the structure of the underlying integrals, demodeling is much faster than Kirchhoff migration, even when applied with full true-amplitude weights. We remind that the demodeling process is analogous to that of Kirchhoff modeling and, thus, needs comparable computing time. Like Kirchhoff migration, demodeling is a target-oriented migration method. However, contrary to Kirchhoff migration, where a target zone needs to be specified, demodeling can directly be restricted to a target reflector. As a disadvantage, we remind that demodeling requires an identification and picking of the events to be migrated. In consequence, its result may vary with the picking algorithm used. For a kinematic migration, traveltime picking is sufficient. For trueamplitude migration, amplitude picking is also necessary. This should, however, not pose a severe restriction to the applicability of the method since the identification of horizons of interest is always necessary at some stage of the seismic processing sequence. In conclusion, the new process is not to be seen as replacement of Kirchhoff migration, but as an alternative and complementary procedure. Possible applications include the fast true-amplitude migration of an identified event to determine whether a promising AVO trend in the CMP section is confirmed after migration. ACKNOWLEDGEMENTS The research of this paper was supported in part by the National Research Council (CNPq – Brazil), the Sao Paulo State Research Foundation (FAPESP – Brazil), and the sponsors of the WIT Consortium. REFERENCES Bojarski, N., 1982, A survey of the near-field far-field inverse scattering inverse source integral equation: IEEE Trans. Ant. Prop., AP-30, no. 5, 975–979.
71 Langenberg, K., 1986, Applied inverse problems for acoustic, electromagnetic, and elastic wave scattering in Sabatier, P., Ed., Basic methods in Tomography and Inverse Problems:: Adam Hilger. Martins, J., Schleicher, J., Tygel, M., and Santos, L., 1997, 2.5-d true-amplitude Kirchhoff migration and demigration: J. Seism. Expl., 6, no. 2/3, 159–180. Porter, R., 1970, Diffraction-limited scalar image formation with holograms of arbitrary shape: J. Acoust. Soc. Am., 60, no. 8, 1051–1059. Ricker, N., 1953, The form and laws of propagation of seismic wavelets: Geophysics, 18, no. 01, 10–40. Rockwell, D., 1971, Migration stack aids interpretation: Oil and Gas Journal, 69, 202– 218. Schneider, W., 1978, Integral formulation for migration in two and three dimensions: Geophysics, 43, no. 1, 49–76. Sommerfeld, A., 1964, Optics:, volume IV of Lectures on Theoretical Physics Academic Press, New York. Tygel, M., Schleicher, J., and Hubral, P., 1995, Dualities between reflectors and reflection-time surfaces: J. Seis. Expl., 4, no. 2, 123–150. Tygel, M., Schleicher, J., Santos, L., and Hubral, P., 2000, An asymptotic inverse to the Kirchhoff-Helmholtz integral: Inv. Probl., 16, 425–445. PUBLICATIONS The general derivation of the demodeling integral in inhomogeneous media was published in (Tygel et al., 2000). APPENDIX A 2.5-D CONSTANT VELOCITY FORMULAS In this appendix we investigate briefly the form of the Inverse Kirchhoff-Helmholtz integral (Tygel et al., 2000), Ë ¼Ó¾¾²Ô Õ7Ö ×ÙØƒÚ ¹ ÛÝÜ2Þ (A-1) »¤¼%½³¾‰¿ÁÀ µ ·5¸º¹ Â¨ÃªÄÆÅ‡ÇÉÈ »Ê¼ ¸º¹ Ë ¾+Ì ¸ ¹ Ë ¾SÍŠÎ¨Ï ¸ ½ÐÀÒÑ ¸º¹ »Ê¼ ¹
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Wave Inversion Technology WIT Annua
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Wave Inversion Technology WIT Wave
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Copyright c 2000 by Karlsruhe Unive
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i TABLE OF CONTENTS Reviews: WIT Re
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Wave Inversion Technology, Report N
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3 theory. It relates properties of
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Imaging 5
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8 two hypothetical eigenwave experi
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7 ¢¥£§¦©¨ ; < calculate sear
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7 7 searches ¡ HNJOL for ¢IHNJML
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14 Trace no. 1000 1500 2000 0.5 1.0
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16 CDP number 3100 3000 2900 2800 2
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18 REFERENCES Höcht, G., de Bazela
Page 32 and 33: 20 INVERSION BY MEANS OF CRS ATTRIB
Page 34 and 35: 22 For synthetic data, it is easy t
Page 36 and 37: — J J J J J J G J - J J G
Page 39 and 40: Wave Inversion Technology, Report N
Page 41 and 42: · · v 0 B 0 £ & Ä Ã & v
Page 43 and 44: 31 Dürbaum, H., 1954, Zur Bestimmu
Page 45 and 46: Ã Ø Ì 0 0 Ì 4 0 Ã 0 G ' 4
Page 49 and 50: 0 0 ˜ ” Z ˜ ” Z 4 4
Page 51 and 52: 39 strategy by combining global and
Page 53 and 54: 41 elled data is presented in Figur
Page 55 and 56: 43 0.2 Distance [m] 1000 1500 2000
Page 57 and 58: 45 In Figure 10 we have the optimiz
Page 59: 47 Gelchinsky, B., 1989, Homeomorph
Page 62 and 63: § ¢ ø ø for a paraxial ray, ref
Page 64 and 65: Œ § … Z ‹ Z § õ ø \ ø §
Page 66 and 67: 54 As stated in Hubral and Krey, 19
Page 68 and 69: § ó § 56 sequence. We made tes
Page 70 and 71: 58 precision of the modeled input d
Page 72 and 73: 60 Cohen, J., Hagin, F., and Bleist
Page 77 and 78: £ 65 The details of the theory inv
Page 79 and 80: 67 of the figure. On both sides, a
Page 81: 69 (a) (b) Depth (m) 600 800 Depth
Page 85 and 86: È Û Ñ¿ = ¨ Í Ñ>* = ¿ + ð
Page 89 and 90: g ý g [ ^ â g [ g g g g g â h [
Page 91 and 92: g § » ¹ [ƒŽ g 79 We now subst
Page 93 and 94: ê 81 ing was realized by an implem
Page 95 and 96: ˆ 83 -0.05 -0.1 Amplitude -0.15 -0
Page 97: 85 on a second-order approximation.
Page 100 and 101: 88 kinematic (related to traveltime
Page 102 and 103: ¨ º Ý È · § À · Á · Á ¼
Page 104 and 105: ° ´ ´ ã ° ¼ ´ ´ þ Ò Ò ¥
Page 106 and 107: 94 1 taper value ksi1 0 ksi2 Figure
Page 108 and 109: 96 0 1 2 3 4 5 Depth [km] CMP [km]
Page 110 and 111: 98 CONCLUSION As a generalization o
Page 112 and 113: 100 weight during the stacking proc
Page 114 and 115: 102 are not illuminated for every o
Page 116 and 117: 104 obtained from Zoeppritz' equati
Page 118 and 119: 106 PreSDM of Porous layer 0.358 re
Page 120 and 121: 108 REFERENCES Gassmann, F., 1951,
Page 122 and 123: 110 et al., 1992), Hanitzsch (1997)
Page 124 and 125: 112 consecutive wavefronts). Howeve
Page 126 and 127: 114 Numerical example We test the W
Page 128 and 129: 116 Versteeg, R., and Grau, G., 199
Page 130 and 131: 118 indicator. To extract elastic p
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€ b b 120 S where is the position
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É É É É 122 The À constant (da
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124 0 Distance [ m ] 1000 2000 3000
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126 Kosloff, D., Sherwood, J., Kore
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128
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130 penetration distances and a pot
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and » ˆ Ö Ö is the scalar hydra
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Å éÙó ó ».-.‹œì/-jì¨‹
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136 TRIGGERING FRONTS IN HETEROGENE
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Ö ˆ Ö “P£'ˆ é ˆ ó,Lˆ¨
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Ö Ö Ê » Ø Ö » Ö Ê Ê Ê Ö
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142 300 250 200 a) eikonal equation
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144 Shapiro, S. A., and Müller, T.
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» i » m ×]Ú ‘Œƒšj'Ÿlk hM
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148 RESULTS Soultz-sous-Forêts Inv
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…„ƒ 150 for the smaller ellips
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152 Figure 5: The cloud of events f
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…„ƒ Î Î ÎÄÈ‹•¨ Î-È
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156 straightforward. The new approa
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158
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160 1982). There is also the so-cal
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{ ³ u ´ ´ ´ ´ -y ›-^œ ´ ´
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Ï u u ¬ 164 To summarize, we deri
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Ý ì á ä é å¤æDçzè ä é
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ø M ã = ã Ù ø ä Ú ã Ù ø
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ã Q c ã ä 170 a=10m; std.dev.=8%
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172 Frankel, A., and Clayton, R. W.
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174 It is well-known that inhomogen
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ã ä ä ŸSŸ S ¡S¡ ©©¨¨ æ
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Kneib, 1995 285-6000 superposition
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180 parameter: Hurst coefficient pa
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182 REFERENCES Bourbié, T., Coussy
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184 1999) in multiple fractured med
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j jÆÅÇ[È”u j jÎÅÇ[È”uw
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190 Davis, P. M., and Knopoff, L.,
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192 properties from the measured se
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194 discussion of these problems ca
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196 Altogether, close to 260 shotpo
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198 Time (ms) 0 2 4 6 8 10 12 14 16
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200 of groundwater. ACKNOWLEDGEMENT
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202
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204 the wavefront curvature matrix
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û ò é from ã äñ to ã î§ñ
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é 208 Table 1: Median relative err
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210 Table 2: Median relative errors
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212 CONCLUSIONS We have presented a
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214 PUBLICATIONS Previous results c
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æVU ìÿå T ü ýWYXZX[ 9\]9^\ Þ
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218 weight functions from traveltim
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220 REFERENCES Bleistein, N., 1986,
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Š Ê ¦ Í ½ Í ’ » Ö ½ Ê
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!¥”“Z• Ç ¤ É¨§ — ‘
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226
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228 In this paper, we present a mor
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L • MM+,ON N N Ž ú R N N N ú
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232 Figure 3: The evolution of a WF
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234 Let us analyze next the computa
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236 CONCLUSIONS We have presented a
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238
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’ Ç r 240 traveltimes, a computa
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Ž Ž Ã Ž 242 Other two approxima
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“ Ã Æ ³ 244 0 0.5 [km] 0 0.5 1
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î r † Û(Û Ü Œ U Ú Ý Ü Û
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248 Ettrich, N., 1998, FD eikonal s
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ø Ð ¡ Ð÷ö Ð'ø ú Ð ¡ Ð'
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ø ü ø ø ý Þ do ø ý Ü
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ø ö ø ú ü ö ü ¡ ü
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‹ 256 transport equation. Neverth
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258 tivalued geometrical spreading
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260 .
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262
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… " ¯ ü ý +- 4=° ü ü +
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ö ô æ º Ò x ¹ v ý ñ
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268 NUMERICAL RESULTS We constructe
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¹ õ ' ' -š' ù ¹ ù ' ' -š
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£ -š' - 272 Ô- —- Figure 6: C
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274 REFERENCES Aldridge, D. F. (199
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276
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278 3. 4. True-amplitude imaging, m
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280 Research Group Hamburg (Gajewsk
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282 Stefan Lüth Robert Patzig Refr
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284 Landmark Graphics Corp. 7409 S.
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286 TotalFinaElf Exploration UK plc
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288 as research assistant at Geoeco
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290 Ingo Koglin is a diploma studen
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292 Matthias Riede received his M.S
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294 Svetlana Soukina received her d
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296 Yonghai Zhang received the Mast
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