Recommended
Recommended
More Related Content
What's hot
What's hot (19)
Viewers also liked
Viewers also liked (20)
Similar to Characterization of Subsurface Heterogeneity: Integration of Soft and Hard Information using Multi-dimensional Coupled Markov Chain Approach
Similar to Characterization of Subsurface Heterogeneity: Integration of Soft and Hard Information using Multi-dimensional Coupled Markov Chain Approach (20)
More from Amro Elfeki
More from Amro Elfeki (20)
Recently uploaded
Recently uploaded (20)
Characterization of Subsurface Heterogeneity: Integration of Soft and Hard Information using Multi-dimensional Coupled Markov Chain Approach
- 1. Characterization of Subsurface Heterogeneity: Integration of Soft and Hard Information using Multi-dimensional Coupled Markov Chain Approach Eungyu Park1, Amro Elfeki1, and Michel Dekking2 1. Dept. of Hydrology and Ecology, 2. Dept. of Applied Probability, Delft University of Technology
- 2. Contents 1. Introduction (Heterogeneity/ Stochastic/Markov Chain) 2. Development of Coupled Markov Chain Theory 3. 2D Implementation 4. 3D Implementation 5. Ensemble Indicator 6. Concluding Remarks
- 3. Subsurface Heterogeneity One can easily experience the heterogeneity from most fields by observing huge variation of its properties from point to point (Gelhar, 1993) The heterogeneity of subsurface has been a long- existing troublesome topic from the very beginning of the subsurface hydrology (Anderson, 1983)
- 4. Deterministic, Random, or Stochastic? Purely random? No Regularity Pure Random Process Purely deterministic? Deterministic Regularity Pure Deterministic Process Something in between? Statistical Regularity Stochastic Process
- 5. Stochastic Model The word stochastic has its origin in the Greek adjective στoχαστικoς which means skilful at aiming or guessing Mathematical models that employ stochastic methods occupy an intermediate position in the spectrum of dynamic models Pure Deterministic Pure Random Stochastic Model
- 6. Why do we need the Stochastic Approach? The erratic nature of the subsurface parameters observed at field data The uncertainty due to the lack of information about the subsurface structure which is known only at sparse sampled locations
- 7. Markov Chains “…which may be regarded as a sequence or chain of discrete state in time (or space) in which the probability of the transition from one state to a given state in the next step in the chain depends on the previous state…” (Harbaugh and Bonham-Carter, 1969 )
- 8. History of Markov Chains Application in Subsurface Characterization Early Work (Traditional Markov Chain) – Krumbein, 1-D (1967) – Habaugh and Bonham-Carter, 1-D (1969) Recent Work – Elfeki, 2-D (1996): unconditional CMC – Elfeki and Dekking, 2-D (2001): conditional CMC – Carle and Fogg, 3-D Model (1996): MC + SIS +SA
- 9. CMC vs. Conventional Technique CMC • Based on conditional probability (transition matrix) • Marginal Probability • Converging Rate (2nd largest eigen value) • Asymmetry can be described • Model specification is not necessary Conventional • Based on variogram or autocovariance • Sill • Correlation Length • Asymmetry is impossible to be described • Model specification is needed to be used in the implementation
- 10. Advantages of Coupled Markov Chain Model Theory is simple and sound. Implementation is easy. Calculation procedure is efficient. Geologic asymmetry can be modeled. Conditioning is straightforward using explicit formulae. Model specification is unnecessary.
- 11. A B C D A 0 0 0 0 B 0 0 0 0 C 0 0 0 0 D 0 0 0 0 Transition Probability Tally Matrix to Transition Probability Matrix A B C D A 0.6 0.1 0.2 0.1 B 0.375 0.625 0 0 C 0.1 0.1 0.8 0 D 0.5 0 0 0.5 p x A B C D A 6 1 2 1 B 3 5 0 0 C 1 1 8 0 D 1 0 0 1
- 12. Transition Probability Properties of Transition Probability Matrix A B lim C D n n w w p w w 0.3659 0.1951 0.3659 0.0732w 1 1 n lk k p n n p p Row-sum n-step transition Marginal probability equals to volume proportion of each lithology n x
- 13. 1D Theory without Conditioning By Markovian property the present is no longer depend on the past history if the immediate past is given Pr Pr i i-1 i-2 i-3 0k l n pr i i-1k l lk | , , S , ,S S S SZ Z Z Z Z | pS SZ Z L
- 14. 1D Theory with Conditioning If the future is given 1 1 1 1 1 Pr ( ) Pr ( | )Pr ( | )Pr ( ) Pr ( | )Pr( ) i i Nk l q N i i i iq k k l l N i iq l l | ,S S SZ Z Z S S S S SZ Z Z Z Z S S SZ Z Z ( ) ( 1) N i lk kq lk q N i lq p p p p If the future is given (Elfeki and Dekking, 2001) →1 when N →∞
- 15. We assume that kflmmilif1+ik1+i pSY,SX|SY,SX ,)Pr( , 1, , 1 1 1 Pr ( ) Pr( )Pr( ) i j i j i jk l m i k i l j k j m ,S S SZ Z Z C X S X S Y S Y S 1 1 n h v lf mf f C .p p where Theory of Coupled Markov Chain in 2D x-chain
- 16. 2D CMC Theory Conditioned on Future States If the future in both directions x and y are given (Elfeki and Dekking, 2001) , 1, , 1 , , ( ) ( ) ( ) ( ) Pr( | , , , ) , 1,... . y x x x x y y y x x x y y y i j k i j l i j m i N p N j q h h N i h h N j lk kq mk kp h h N i h h N j lf fq mf fp f Z S Z S Z S Z S Z S p p p p k n p p p p x-chain
- 17. Calculation Sequence Geologically plausible information transfer – Information is sequentially transferred to horizontal direction – Information is sequentially transferred to vertical direction boundary calculated unknown x y
- 19. 3D Theory Likewise , , 1, , , 1, , , 1 , , , , , , 1, , , , , , , 1, , , , , , , 1 ( ) ( 1) Pr , , , , Pr , Pr , Pr x y x y x x i j k o i j k l i j k m i j k n N j k p i N k q i j k o i j k l N j k p i j k o i j k m i N k q i j k o i j k n hx N ihx hy lo op mo hx N i lp Z S Z S Z S Z S Z S Z S C Z S Z S Z S Z S Z S Z S Z S Z S p p p C p ( ) ( 1) y y hy N j oq v nohy N j mq p p p where 1( )( ) ( 1)( 1) yx yx hy N jhx N ihx hy v lr mr nr rp rq hy N jhx N i r lp mq p p p p p C p p
- 20. Active Conditioning Use the tolerance angle along scanning and perpendicular to scanning direction x y
- 21. General Algorithm 1. Discretizing domain 2. Saving conditioning data 3. Deriving transition probabilities 4. Applying 1-, 2-, and 3D equations to the domain 5. Generate equally probable single realizations 6. Repeat step 1 through 5, if multiple realization are desired 7. Do Monte Carlo analysis if desired using equally probable multiple realizations generated from step 6
- 22. Applications of Coupled Markov Chain Model MADE site (16 Boreholes) Input Borehole Data x=3 m y=0.1 m
- 23. Geological Map (Adams and Gelhar, 1992) Simulated Image using CMC
- 24. Improved Reproduction By New Scheme •Original •Sparse 71% Reproduction of Original 78% Reproduction of Original •Previous Scheme •New Scheme (Angle Tolerance)
- 25. Monte Carlo Simulation and Ensemble Indicator Map Multiple Realizations 1 2 3 4 5 6 7 lith Ensemble Indicator Map Ensemble Indicator Function 0 1
- 26. The theory of 3D Coupled Markov Chain Model (3D CMC) is developed and programmed under MATLAB environment Development of 3D CMC
- 27. 3D Single Realization using 3D CMC
- 28. 3D Ensemble Indicator Function of Lithology 3
- 29. Statistical Mapping of 3D Ensemble Indicator Function of Lithology 3 10%+ certainty range 90%+ certainty range
- 30. 10 % 90 % 50 % Statistical Mapping of 3D Ensemble Indicator Function of Lithology 2 ABC
- 31. Sample Flow Simulation MODFLOW by USGS
- 32. Sample Transport Simulation Random Walk Particle Tracking Method x y
- 33. Future Improvement of 3D CMC Developing error minimizing sequences Enhancing data adaptability by incorporating data from various sources (soft geologic data, i.e. geophysical, GPR, CPT, seismic data) Integrating flow simulator (FDM or FEM) Integrating solute transport simulator (RWPT or MOC) Integrating with spatial database (GIS) Need to verify the Model through various 3D application using hard data as well as soft data and cross-validation techniques Optimum estimation of horizontal transition probabilities
- 34. Concluding Remarks 3D Coupled Markov Chain (3D CMC) is developed through this study Efficient way of utilization of the horizontal data is added to 2D CMC MATLAB software CMC3D is developed and flow and transport simulators are attached