Integrating multiple scales of hydraulic conductivity measurements in training image‐based stochastic models

Hydraulic conductivity is one of the most critical and at the same time one of the most uncertain parameters in many groundwater models. One problem commonly faced is that the data are usually not collected at the same scale as the discretized elements used in a numerical model. Moreover, it is common that different types of hydraulic conductivity measurements, corresponding to different spatial scales, coexist in a studied domain, which have to be integrated simultaneously. Here we address this issue in the context of Image Quilting, one of the recently developed multiple-point geostatistics methods. Based on a training image that represents fine-scale spatial variability, we use the simplified renormalization upscaling method to obtain a series of upscaled training images that correspond to the different scales at which measurements are available. We then apply Image Quilting with such a multiscale training image to be able to incorporate simultaneously conditioning data at several spatial scales of heterogeneity. The realizations obtained satisfy the conditioning data exactly across all scales, but it can come at the expense of a small approximation in the representation of the physical scale relationships. In order to mitigate this approximation, we iteratively apply a kriging-based correction to the finest scale that ensures local conditioning at the coarsest scales. The method is tested on a series of synthetic examples where it gives good results and shows potential for the integration of different measurement methods in real-case hydrogeological models.

[1]  M. Blunt,et al.  Pore space reconstruction of vuggy carbonates using microtomography and multiple‐point statistics , 2007 .

[2]  L. Y. Hu,et al.  Multiple‐point geostatistics for modeling subsurface heterogeneity: A comprehensive review , 2008 .

[3]  W. T. Cardwell,et al.  Average Permeabilities of Heterogeneous Oil Sands , 1945 .

[4]  Xin He,et al.  The effect of training image and secondary data integration with multiple-point geostatistics in groundwater modelling , 2013 .

[5]  K. Faez,et al.  Stochastic simulation of patterns using Bayesian pattern modeling , 2013, Computational Geosciences.

[6]  C. Paola,et al.  The “unreasonable effectiveness” of stratigraphic and geomorphic experiments , 2008 .

[7]  Tuan D. Pham,et al.  Identification of intestinal wall abnormalities and ischemia by modeling spatial uncertainty in computed tomography imaging findings , 2014, Comput. Methods Programs Biomed..

[8]  S. P. Neuman Universal scaling of hydraulic conductivities and dispersivities in geologic media , 1990 .

[9]  G. Mariéthoz,et al.  An Improved Parallel Multiple-point Algorithm Using a List Approach , 2011 .

[10]  Julián M. Ortiz,et al.  A Comparison of Random Field Models Beyond Bivariate Distributions , 2011 .

[11]  Dirk Schulze-Makuch,et al.  Variations in hydraulic conductivity with scale of measurement during aquifer tests in heterogeneous, porous carbonate rocks , 1998 .

[12]  G. Matheron Éléments pour une théorie des milieux poreux , 1967 .

[13]  Pejman Tahmasebi,et al.  Multiple-point geostatistical modeling based on the cross-correlation functions , 2012, Computational Geosciences.

[14]  J. Caers,et al.  Conditional Simulation with Patterns , 2007 .

[15]  J. Jaime Gómez-Hernández,et al.  Three-dimensional hydraulic conductivity upscaling in groundwater modeling , 2010, Comput. Geosci..

[16]  Clayton V. Deutsch,et al.  Deriving Constraints on Small-Scale Variograms due to Variograms of Large-Scale Data , 1998 .

[17]  X. Sanchez‐Vila,et al.  Representative hydraulic conductivities in saturated groundwater flow , 2006 .

[18]  Change of Support for Estimating Local Block Grade Distributions , 2008 .

[19]  Mickaele Le Ravalec,et al.  Multiscale Parameterization of Petrophysical Properties for Efficient History-Matching , 2014, Mathematical Geosciences.

[20]  Clayton V. Deutsch,et al.  A sequential indicator simulation program for categorical variables with point and block data: BlockSIS , 2006, Comput. Geosci..

[21]  J. Caers Interpreter's Corner—Stochastic integration of seismic data and geologic scenarios: A West Africa submarine channel saga , 2003 .

[22]  Sebastien Strebelle,et al.  Conditional Simulation of Complex Geological Structures Using Multiple-Point Statistics , 2002 .

[23]  Tuan D. Pham,et al.  Supervised restoration of degraded medical images using multiple-point geostatistics , 2012, Comput. Methods Programs Biomed..

[24]  Xavier Emery,et al.  Change-of-support models and computer programs for direct block-support simulation , 2009, Comput. Geosci..

[25]  J. Gómez-Hernández,et al.  Stochastic characterization of gridblock permeabilities , 1994 .

[26]  R. M. Srivastava,et al.  Multivariate Geostatistics: Beyond Bivariate Moments , 1993 .

[27]  G. Mariéthoz,et al.  Simulation of Earth textures by conditional image quilting , 2014 .

[28]  Paul Switzer,et al.  Filter-Based Classification of Training Image Patterns for Spatial Simulation , 2006 .

[29]  G. Dagan Statistical Theory of Groundwater Flow and Transport: Pore to Laboratory, Laboratory to Formation, and Formation to Regional Scale , 1986 .

[30]  R. Froidevaux,et al.  An efficient maximum entropy approach for categorical variable prediction , 2011 .

[31]  Gregoire Mariethoz,et al.  Training Images from Process-Imitating Methods , 2013, Mathematical Geosciences.

[32]  Philippe Renard,et al.  Simulation of rainfall time series from different climatic regions using the direct sampling technique , 2014 .

[33]  G. Dagan Flow and transport in porous formations , 1989 .

[34]  S. Gorelick,et al.  Identifying discrete geologic structures that produce anomalous hydraulic response: An inverse modeling approach , 2008 .

[35]  D. Partington,et al.  Fully integrated modeling of surface‐subsurface solute transport and the effect of dispersion in tracer hydrograph separation , 2014 .

[36]  Alain Dassargues,et al.  Modeling the effect of clay drapes on pumping test response in a cross-bedded aquifer using multiple-point geostatistics , 2012 .

[37]  Alexandre Boucher,et al.  Geostatistical Solutions for Super-Resolution Land Cover Mapping , 2008, IEEE Transactions on Geoscience and Remote Sensing.

[38]  M. Sahimi,et al.  Cross-correlation function for accurate reconstruction of heterogeneous media. , 2013, Physical Review Letters.

[39]  Roussos G. Dimitrakopoulos,et al.  HOSIM: A high-order stochastic simulation algorithm for generating three-dimensional complex geological patterns , 2011, Comput. Geosci..

[40]  J. Gibson The perception of the visual world , 1951 .

[41]  Daniel Patel,et al.  Sketch-based modelling and visualization of geological deposition , 2014, Comput. Geosci..

[42]  G. Mariéthoz,et al.  Multiple-point Geostatistics: Stochastic Modeling with Training Images , 2014 .

[43]  A. Journel,et al.  Fast FILTERSIM Simulation with Score-based Distance , 2008 .

[44]  G. Mariéthoz,et al.  Demonstration of a geostatistical approach to physically consistent downscaling of climate modeling simulations , 2013 .

[45]  Peter M. Atkinson,et al.  Multiple-point geostatistical simulation for post-processing a remotely sensed land cover classification , 2013 .

[46]  Steven M. Gorelick,et al.  Effective groundwater model parameter values: Influence of spatial variability of hydraulic conductivity, leakance, and recharge , 1989 .

[47]  Antoine Saucier,et al.  A patchwork approach to stochastic simulation: A route towards the analysis of morphology in multiphase systems , 2008 .

[48]  Sylvain Lefebvre,et al.  Bridges between multiple-point geostatistics and texture synthesis: Review and guidelines for future research , 2014, Comput. Geosci..

[49]  Philippe Renard,et al.  A fast algorithm for the estimation of the equivalent hydraulic conductivity of heterogeneous media , 2000 .

[50]  J. McKinley,et al.  Coupling ground and airborne geophysical data with upscaling techniques for regional groundwater modeling of heterogeneous aquifers: Case study of a sedimentary aquifer intruded by volcanic dykes in Northern Ireland , 2014 .

[51]  C. Clauser Permeability of crystalline rocks , 1992 .

[52]  Jef Caers,et al.  Training image-based scenario modeling of fractured reservoirs for flow uncertainty quantification , 2013, Computational Geosciences.

[53]  Andrew Richard Gardiner,et al.  Best practice stochastic facies modeling from a channel-fill turbidite sandstone analog (the Quarry outcrop, Eocene Ainsa basin, northeast Spain) , 2006 .

[54]  D. Cherkauer,et al.  Scale Dependency of Hydraulic Conductivity Measurements , 1995 .

[55]  D. Marcotte Direct Conditional Simulation of Block Grades , 1994 .

[56]  Omid Asghari,et al.  Multiple-point geostatistical simulation using the bunch-pasting direct sampling method , 2013, Comput. Geosci..

[57]  C. L. Farmer,et al.  Upscaling: a review , 2002 .

[58]  S. Gorelick,et al.  Paleoclimatic Signature in Terrestrial Flood Deposits , 1992, Science.

[59]  Clayton V. Deutsch,et al.  Quantifying Resources for the Surmont Lease with 2D Mapping and Multivariate Statistics , 2008 .

[60]  André G. Journel,et al.  A package for geostatistical integration of coarse and fine scale data , 2009, Comput. Geosci..

[61]  D. Marcotte,et al.  A new patchwork simulation method with control of the local-mean histogram , 2012, Stochastic Environmental Research and Risk Assessment.

[62]  Jens Christian Refsgaard,et al.  Challenges in conditioning a stochastic geological model of a heterogeneous glacial aquifer to a comprehensive soft data set , 2013 .

[63]  Alexandre Boucher,et al.  Multivariate Block-Support Simulation of the Yandi Iron Ore Deposit, Western Australia , 2012, Mathematical Geosciences.

[64]  P. Renard,et al.  Calculating equivalent permeability: a review , 1997 .

[65]  A. Safekordi,et al.  A multiple-point statistics algorithm for 3D pore space reconstruction from 2D images , 2011 .

[66]  T. Tran,et al.  The ‘missing scale’ and direct simulation of block effective properties , 1996 .

[67]  L. Hu,et al.  Multiple-Point Simulations Constrained by Continuous Auxiliary Data , 2008 .

[68]  Beverly L. Herzog,et al.  Hydraulic Conductivity At a Hazardous Waste Disposal Site: Comparison of Laboratory and Field-Determined Values , 1986 .

[69]  Edsger W. Dijkstra,et al.  A note on two problems in connexion with graphs , 1959, Numerische Mathematik.

[70]  Philippe Renard,et al.  Spatiotemporal reconstruction of gaps in multivariate fields using the direct sampling approach , 2012 .

[71]  G. Marsily,et al.  An Automatic Solution for the Inverse Problem , 1971 .

[72]  Charles F. Harvey,et al.  When good statistical models of aquifer heterogeneity go bad: A comparison of flow, dispersion, and mass transfer in connected and multivariate Gaussian hydraulic conductivity fields , 2003 .

[73]  Alexei A. Efros,et al.  Image quilting for texture synthesis and transfer , 2001, SIGGRAPH.

[74]  H. Posamentier,et al.  Architecture of turbidite channel systems on the continental slope: Patterns and predictions , 2011 .