Ensemble-based optimization of interwell connectivity in heterogeneous waterflooding reservoirs

Abstract Estimation of interwell connectivity is of great importance to optimization of injection-production scheme and decision-making of potential-tapping strategies during the later stage of waterflooding. However, the traditional reservoir simulation requires detailed information of various reservoir/fluid parameters, which is time-consuming and difficult to obtain the reliable estimates due to large uncertainties. The capacitance-resistance model inferred from field injection and production data provides an attractive alternative to understanding the interwell connectivity relationship and close-loop reservoir management. For this study, the producer-based and injector-producer pair-based capacitance resistance model, CRMP and CRMIP, are employed to compute liquid production rate of each producer, respectively, followed by description of observed water cut data using the Koval fractional-flow equation. Then, this paper proposes a novel framework that enables the newly developed Stochastic Simplex Appropximate Gradient (StoSAG) algorithm to optimize interwell connectivity in waterflooding reservoirs by preconditioning the hybrid nonlinear constraints, which is further validated by a heterogeneous synthetic case. The results show that, compared to the projected-gradient (PG) and EnKF methods, the StoSAG optimization technique can handle the sequential data assimilation in large-scale nonlinear dynamics more robustly; due to more degrees of freedom, the CRMIP representation captures the reservoir's dynamic behavior better than CRMP, resulting in a more satisfactory estimation of geological parameters relative to each reservoir control volume; The Koval fractional-flow equation are effective to represent the water-producing characteristics from small-to-large water cut period, but a great deviation will be caused during the extra-high water cut stage ( f w >90%) because of its inherent drawbacks.

[1]  Pablo Hugo Gentil The Use of Multilinear Regression Models in Patterned Waterfloods: Physical Meaning of the Regression Coefficients , 2005 .

[2]  Albert C. Reynolds,et al.  Ensemble-Based Optimization of the Water-Alternating-Gas-Injection Process , 2016 .

[3]  C. S. Kabir,et al.  The Use of Capacitance-Resistive Models for Rapid Estimation of Waterflood Performance , 2007 .

[4]  Eduardo Gildin,et al.  Improved Waterflood Analysis Using the Capacitance-Resistance Model Within a Control Systems Framework , 2015 .

[5]  Anh Phuong Nguyen Capacitance resistance modeling for primary recovery, waterflood and water-CO₂ flood , 2012 .

[6]  He Xiao-yan Uncertainty analysis of remaining oil predicted with reservoir numerical simulation , 2004 .

[7]  Danial Kaviani,et al.  Application of the Multiwell Productivity Index-Based Method to Evaluate Interwell Connectivity , 2010 .

[8]  Steven L. Bryant,et al.  Optimizing Carbon Sequestration With the Capacitance/Resistance Model , 2015 .

[9]  Pablo Hugo Gentil,et al.  A Capacitance Model To Infer Interwell Connectivity From Production and Injection Rate Fluctuations , 2005 .

[10]  L. Lake,et al.  Oil-Rate Forecast by Inferring Fractional-Flow Models From Field Data With Koval Method Combined With the Capacitance/Resistance Model , 2015 .

[11]  Peyman Pourafshary,et al.  Water flooding performance prediction in layered reservoirs using improved capacitance-resistive model , 2013 .

[12]  Ning Liu,et al.  Inverse Theory for Petroleum Reservoir Characterization and History Matching , 2008 .

[13]  Albert C. Reynolds,et al.  An Adaptive Hierarchical Multiscale Algorithm for Estimation of Optimal Well Controls , 2014 .

[14]  Albert C. Reynolds,et al.  An Improved Implementation of the LBFGS Algorithm for Automatic History Matching , 2004 .

[15]  Dean S. Oliver,et al.  Smart Well Production Optimization Using An Ensemble-Based Method , 2010 .

[16]  Iraj Ershaghi,et al.  An Active Method for Characterization of Flow Units Between Injection/Production Wells by Injection-Rate Design , 2011 .

[17]  Hui Zhao,et al.  INSIM: A Data-Driven Model for History Matching and Prediction for Waterflooding Monitoring and Management with a Field Application , 2015, ANSS 2015.

[18]  David Castineira,et al.  Combining Decline-Curve Analysis and Capacitance/Resistance Models To Understand and Predict the Behavior of a Mature Naturally Fractured Carbonate Reservoir Under Gas Injection , 2012 .

[19]  Gustavo A. Moreno Multilayer capacitance–resistance model with dynamic connectivities , 2013 .

[20]  J. Jansen,et al.  A Stochastic Simplex Approximate Gradient (StoSAG) for optimization under uncertainty , 2017 .

[21]  Dongxiao Zhang,et al.  New method for reservoir characterization and optimization using CRM–EnOpt approach , 2011 .

[22]  Hui Zhao,et al.  Maximization of a Dynamic Quadratic Interpolation Model for Production Optimization , 2011, ANSS 2011.

[23]  Albert C. Reynolds,et al.  Robust Constrained Optimization of Short- and Long-Term Net Present Value for Closed-Loop Reservoir Management , 2012 .

[24]  P.M.J. Van den Hof,et al.  Ensemble-based hierarchical multi-objective production optimization of smart wells , 2014, Computational Geosciences.

[25]  Antonio Ortega,et al.  Injection Scheduling Design for Reduced Order Waterflood Modeling , 2013 .

[26]  Larry W. Lake,et al.  Analysis and Interpretation of Interwell Connectivity From Production and Injection Rate Fluctuations Using a Capacitance Model , 2006 .

[27]  Heng Li,et al.  Water flooding performance prediction by multi-layer capacitance-resistive models combined with the ensemble Kalman filter , 2015 .

[28]  Dongxiao Zhang,et al.  Efficient Ensemble-Based Closed-Loop Production Optimization , 2009 .

[29]  Hui Zhao,et al.  History matching and production optimization of water flooding based on a data-driven interwell numerical simulation model , 2016 .

[30]  K. Katterbauer History Matching for Steam Drive Heavy Oil Reservoirs Using Ensemble Based Techniques - A synthetic Wafra Oil Field Case Study , 2015 .

[31]  L. Lake,et al.  Development of a Fully Coupled Two-phase Flow Based Capacitance Resistance Model (CRM) , 2014 .

[32]  A. Reynolds,et al.  Theoretical connections between optimization algorithms based on an approximate gradient , 2013, Computational Geosciences.

[33]  Eduardo Gildin,et al.  Efficient Production Optimization With Flow-Network Models , 2014 .