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Migration Intuitive Least Squares Migration Green’s Theorem.

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Presentation on theme: "Migration Intuitive Least Squares Migration Green’s Theorem."— Presentation transcript:

1 Migration Intuitive Least Squares Migration Green’s Theorem

2 Smear Reflections along Fat Circles
ZO Migration Smear Reflections along Fat Circles xx + T o 2-way time (x-x ) + y 2 c/2 xx = x Where did reflections come from? Thickness = c*T /2 o x d(x , ) xx

3 Smear Reflections along Fat Circles
ZO Migration Smear Reflections along Fat Circles x & Sum 1-way time d(x , ) xx Hey, that’s our ZO migration formula

4 Smear Reflections along Circles
ZO Migration Smear Reflections along Circles x & Sum 1-way time Out-of--Phase In-Phase d(x , ) xx m(x)=

5 d =  L m Born Forward Modeling ~  e  ij j i d(x) =  m(x’) i
A(x,x’) xx’ i e ~ d =  L m ij j i d(x) = x’ g(x|x’) m(x’) reflectivity

6 Seismic Inverse Problem
Given: d = Lm Find: m(x,y,z) Soln: min || Lm-d || 2 waveform inversion m = [L L] L d T -1 migration L d T

7 ~ ~ Forward Modeling (d = Lo) ZO Depth Migration (m L d) d(x, )   e
.. d(x, ) xx’ Fourier Transform A(x,x’) xx’ i e ~ m(x’) d(x) ~ ~ d(x) = x’ g(x|x’) w 2 m(x’) x .. m(x’) reflectivity x d(x, ) A(x,x’) xx’ =

8 Migration m=L d Forward Problem: d=Lm Intuitive Least Squares
Japan Sea Example Migration m=L d T Green’s Theorem

9 LSM Image with a Ricker Wavelet (15 Hz)
Kirchhoff Migration Image 2 Depth (km) X (km) LSM Image Actual Model 2 Depth (km) X (km)

10 2D Poststack Data from Japan Sea
JAPEX 2D SSP marine data description: Acquired in 1974, Dominant frequency of 15 Hz. 5 TWT (s) 20 X (km) 10

11 LSM vs. Kirchhoff Migration
LSM Image 0.7 1.9 Depth (km) 2.4 4.9 X (km) 0.7 1.9 Depth (km) 2.4 4.9 X (km) Kirchhoff Migration Image

12 Migration Intuitive Least Squares Migration Green’s Theorem

13 Summary  d(x, ) .. m(x’)  = 1. ZO migration: cos xx’ x A(x,x’)
q obliquity .. xx’ m(x’) x d(x, ) = 1. ZO migration: cos q Approx. reflectivity A(x,x’) 2. ZO migration assumptions: Single scattering data 3. ZO migration matrix-vec: m=L d T ~ Compensates for Illumination footprint and poor illumination 4. LSM ZO migration matrix-vec: m=[L L] L d T -1 5. ZO migration smears an event along appropriate doughnut

14 Least Squares  Recall: Lm=d Find: m that minimizes sum of squared
j ij Find: m that minimizes sum of squared residuals r = L m - d i (r ,r) = ([Lm-d],[Lm-d]) = m L Lm -2m Ld-d d (r ,r) d dm i = 2 m L Lm -2 m Ld = 0 For all i L Lm = Ld Normal equations

15 Dot Products and Adjoint Operators
Recall: (u,u) = u* u i Recall: (v,Lu) = v* ( L u ) j i ij [ L v* ]u j i ij = [ L* v ]* u j i ij = So adjoint of L is L  i ij L*

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