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dc.contributor.author | Xu, Teng | es_ES |
dc.contributor.author | Gómez-Hernández, J. Jaime | es_ES |
dc.date.accessioned | 2018-02-19T05:10:25Z | |
dc.date.available | 2018-02-19T05:10:25Z | |
dc.date.issued | 2016 | es_ES |
dc.identifier.issn | 0043-1397 | es_ES |
dc.identifier.uri | http://hdl.handle.net/10251/98066 | |
dc.description.abstract | Reliable characterization of hydraulic parameters is important for the understanding of groundwater flow and solute transport. The normal-score ensemble Kalman filter (NS-EnKF) has proven to be an effective inverse method for the characterization of non-Gaussian hydraulic conductivities by assimilating transient piezometric head data, or solute concentration data. Groundwater temperature, an easily captured state variable, has not drawn much attention as an additional state variable useful for the characterization of aquifer parameters. In this work, we jointly estimate non-Gaussian aquifer parameters (hydraulic conductivities and porosities) by assimilating three kinds of state variables (piezometric head, solute concentration, and groundwater temperature) using the NS-EnKF. A synthetic example including seven tests is designed, and used to evaluate the ability to characterize hydraulic conductivity and porosity in a non-Gaussian setting by assimilating different numbers and types of state variables. The results show that characterization of aquifer parameters can be improved by assimilating groundwater temperature data and that the main patters of the non-Gaussian reference fields can be retrieved with more accuracy and higher precision if multiple state variables are assimilated. | es_ES |
dc.description.sponsorship | Financial support to carry out this work was provided by the Spanish Ministry of Economy and Competitiveness through project CGL2014-59841-P. All data used in this analysis are available from the authors. | es_ES |
dc.language | Inglés | es_ES |
dc.publisher | John Wiley & Sons | es_ES |
dc.relation.ispartof | Water Resources Research | es_ES |
dc.rights | Reserva de todos los derechos | es_ES |
dc.subject | Normal-score ensemble Kalman filter | es_ES |
dc.subject | Groundwater temperature | es_ES |
dc.subject | Heat transport | es_ES |
dc.subject | Inverse modeling | es_ES |
dc.subject | Normal-score transform | es_ES |
dc.subject.classification | INGENIERIA HIDRAULICA | es_ES |
dc.title | Characterization of non-Gaussian conductivities and porosities with hydraulic heads, solute concentrations, and water temperatures | es_ES |
dc.type | Artículo | es_ES |
dc.identifier.doi | 10.1002/2016WR019011 | es_ES |
dc.relation.projectID | info:eu-repo/grantAgreement/MINECO//CGL2014-59841-P/ES/¿QUIEN HA SIDO?/ | es_ES |
dc.rights.accessRights | Abierto | es_ES |
dc.contributor.affiliation | Universitat Politècnica de València. Departamento de Ingeniería Hidráulica y Medio Ambiente - Departament d'Enginyeria Hidràulica i Medi Ambient | es_ES |
dc.contributor.affiliation | Universitat Politècnica de València. Instituto Universitario de Ingeniería del Agua y del Medio Ambiente - Institut Universitari d'Enginyeria de l'Aigua i Medi Ambient | es_ES |
dc.description.bibliographicCitation | Xu, T.; Gómez-Hernández, JJ. (2016). Characterization of non-Gaussian conductivities and porosities with hydraulic heads, solute concentrations, and water temperatures. Water Resources Research. 52(8):6111-6136. https://doi.org/10.1002/2016WR019011 | es_ES |
dc.description.accrualMethod | S | es_ES |
dc.relation.publisherversion | http://doi.org/10.1002/2016WR019011 | es_ES |
dc.description.upvformatpinicio | 6111 | es_ES |
dc.description.upvformatpfin | 6136 | es_ES |
dc.type.version | info:eu-repo/semantics/publishedVersion | es_ES |
dc.description.volume | 52 | es_ES |
dc.description.issue | 8 | es_ES |
dc.relation.pasarela | S\332205 | es_ES |
dc.contributor.funder | Ministerio de Economía, Industria y Competitividad | es_ES |
dc.description.references | Alcolea, A., Carrera, J., & Medina, A. (2006). Pilot points method incorporating prior information for solving the groundwater flow inverse problem. Advances in Water Resources, 29(11), 1678-1689. doi:10.1016/j.advwatres.2005.12.009 | es_ES |
dc.description.references | Anderson, M. P. (2005). Heat as a Ground Water Tracer. Ground Water, 43(6), 951-968. doi:10.1111/j.1745-6584.2005.00052.x | es_ES |
dc.description.references | Bravo, H. R., Jiang, F., & Hunt, R. J. (2002). Using groundwater temperature data to constrain parameter estimation in a groundwater flow model of a wetland system. Water Resources Research, 38(8), 28-1-28-14. doi:10.1029/2000wr000172 | es_ES |
dc.description.references | Capilla, J. E., & Llopis-Albert, C. (2009). Gradual conditioning of non-Gaussian transmissivity fields to flow and mass transport data: 1. Theory. Journal of Hydrology, 371(1-4), 66-74. doi:10.1016/j.jhydrol.2009.03.015 | es_ES |
dc.description.references | Chang, H., Zhang, D., & Lu, Z. (2010). History matching of facies distribution with the EnKF and level set parameterization. Journal of Computational Physics, 229(20), 8011-8030. doi:10.1016/j.jcp.2010.07.005 | es_ES |
dc.description.references | Chen , Y. D. S. Oliver 2010 | es_ES |
dc.description.references | Chen, Y., Oliver, D. S., & Zhang, D. (2009). Data assimilation for nonlinear problems by ensemble Kalman filter with reparameterization. Journal of Petroleum Science and Engineering, 66(1-2), 1-14. doi:10.1016/j.petrol.2008.12.002 | es_ES |
dc.description.references | Doussan, C., Toma, A., Paris, B., Poitevin, G., Ledoux, E., & Detay, M. (1994). Coupled use of thermal and hydraulic head data to characterize river-groundwater exchanges. Journal of Hydrology, 153(1-4), 215-229. doi:10.1016/0022-1694(94)90192-9 | es_ES |
dc.description.references | Dovera, L., & Della Rossa, E. (2010). Multimodal ensemble Kalman filtering using Gaussian mixture models. Computational Geosciences, 15(2), 307-323. doi:10.1007/s10596-010-9205-3 | es_ES |
dc.description.references | Evensen, G. (2003). The Ensemble Kalman Filter: theoretical formulation and practical implementation. Ocean Dynamics, 53(4), 343-367. doi:10.1007/s10236-003-0036-9 | es_ES |
dc.description.references | Franssen, H.-J. H., Gómez-Hernández, J., & Sahuquillo, A. (2003). Coupled inverse modelling of groundwater flow and mass transport and the worth of concentration data. Journal of Hydrology, 281(4), 281-295. doi:10.1016/s0022-1694(03)00191-4 | es_ES |
dc.description.references | Fu, J., & Jaime Gómez-Hernández, J. (2009). Uncertainty assessment and data worth in groundwater flow and mass transport modeling using a blocking Markov chain Monte Carlo method. Journal of Hydrology, 364(3-4), 328-341. doi:10.1016/j.jhydrol.2008.11.014 | es_ES |
dc.description.references | Gómez-Hernández, J. J., & Journel, A. G. (1993). Joint Sequential Simulation of MultiGaussian Fields. Geostatistics Tróia ’92, 85-94. doi:10.1007/978-94-011-1739-5_8 | es_ES |
dc.description.references | Gómez-Hernández, J. J., & Wen, X.-H. (1994). Probabilistic assessment of travel times in groundwater modeling. Stochastic Hydrology and Hydraulics, 8(1), 19-55. doi:10.1007/bf01581389 | es_ES |
dc.description.references | G�mez-Hern�ndez, J. J., Franssen, H.-J. W. M. H., & Sahuquillo, A. (2003). Stochastic conditional inverse modeling of subsurface mass transport: A brief review and the self-calibrating method. Stochastic Environmental Research and Risk Assessment (SERRA), 17(5), 319-328. doi:10.1007/s00477-003-0153-5 | es_ES |
dc.description.references | Gordon , N. D. Salmond A. Smith 1993 Novel approach to nonlinear/non-Gaussian Bayesian state estimation Proc. Inst. Electr. Eng. 140 107 113 | es_ES |
dc.description.references | Gu, Y., & Oliver, D. S. (2005). The Ensemble Kalman Filter for Continuous Updating of Reservoir Simulation Models. Journal of Energy Resources Technology, 128(1), 79-87. doi:10.1115/1.2134735 | es_ES |
dc.description.references | Gu, Y., & Oliver, D. S. (2007). An Iterative Ensemble Kalman Filter for Multiphase Fluid Flow Data Assimilation. SPE Journal, 12(04), 438-446. doi:10.2118/108438-pa | es_ES |
dc.description.references | Hu, L. Y. (2000). Mathematical Geology, 32(1), 87-108. doi:10.1023/a:1007506918588 | es_ES |
dc.description.references | Kalman, R. E. (1960). A New Approach to Linear Filtering and Prediction Problems. Journal of Basic Engineering, 82(1), 35-45. doi:10.1115/1.3662552 | es_ES |
dc.description.references | Kurtz, W., Hendricks Franssen, H.-J., Kaiser, H.-P., & Vereecken, H. (2014). Joint assimilation of piezometric heads and groundwater temperatures for improved modeling of river-aquifer interactions. Water Resources Research, 50(2), 1665-1688. doi:10.1002/2013wr014823 | es_ES |
dc.description.references | Li, L., Zhou, H., Gómez-Hernández, J. J., & Hendricks Franssen, H.-J. (2012). Jointly mapping hydraulic conductivity and porosity by assimilating concentration data via ensemble Kalman filter. Journal of Hydrology, 428-429, 152-169. doi:10.1016/j.jhydrol.2012.01.037 | es_ES |
dc.description.references | Li, L., Zhou, H., Hendricks Franssen, H. J., & Gómez-Hernández, J. J. (2011). Groundwater flow inverse modeling in non-MultiGaussian media: performance assessment of the normal-score Ensemble Kalman Filter. Hydrology and Earth System Sciences Discussions, 8(4), 6749-6788. doi:10.5194/hessd-8-6749-2011 | es_ES |
dc.description.references | Liu , N. D. Oliver 2005 Critical evaluation of the ensemble Kalman filter on history matching of geologic facies SPE Reservoir Eval. Eng. 8 6 470 477 | es_ES |
dc.description.references | Losa, S. N., Kivman, G. A., Schröter, J., & Wenzel, M. (2003). Sequential weak constraint parameter estimation in an ecosystem model. Journal of Marine Systems, 43(1-2), 31-49. doi:10.1016/j.jmarsys.2003.06.001 | es_ES |
dc.description.references | Ma , R. C. Zheng 2010 Effects of density and viscosity in modeling heat as a groundwater tracer, Groundwater 48 3 380 389 | es_ES |
dc.description.references | Ma, R., Zheng, C., Zachara, J. M., & Tonkin, M. (2012). Utility of bromide and heat tracers for aquifer characterization affected by highly transient flow conditions. Water Resources Research, 48(8). doi:10.1029/2011wr011281 | es_ES |
dc.description.references | McDonald , M. A. Harbaugh 1988 | es_ES |
dc.description.references | Oliver, D. S., Cunha, L. B., & Reynolds, A. C. (1997). Markov chain Monte Carlo methods for conditioning a permeability field to pressure data. Mathematical Geology, 29(1), 61-91. doi:10.1007/bf02769620 | es_ES |
dc.description.references | RamaRao, B. S., LaVenue, A. M., De Marsily, G., & Marietta, M. G. (1995). Pilot Point Methodology for Automated Calibration of an Ensemble of conditionally Simulated Transmissivity Fields: 1. Theory and Computational Experiments. Water Resources Research, 31(3), 475-493. doi:10.1029/94wr02258 | es_ES |
dc.description.references | Reich, S. (2011). A Gaussian-mixture ensemble transform filter. Quarterly Journal of the Royal Meteorological Society, 138(662), 222-233. doi:10.1002/qj.898 | es_ES |
dc.description.references | Simon, E., & Bertino, L. (2009). Application of the Gaussian anamorphosis to assimilation in a 3-D coupled physical-ecosystem model of the North Atlantic with the EnKF: a twin experiment. Ocean Science, 5(4), 495-510. doi:10.5194/os-5-495-2009 | es_ES |
dc.description.references | Strebelle, S. (2002). Mathematical Geology, 34(1), 1-21. doi:10.1023/a:1014009426274 | es_ES |
dc.description.references | Sun, A. Y., Morris, A. P., & Mohanty, S. (2009). Sequential updating of multimodal hydrogeologic parameter fields using localization and clustering techniques. Water Resources Research, 45(7). doi:10.1029/2008wr007443 | es_ES |
dc.description.references | Van Leeuwen, P. J. (2009). Particle Filtering in Geophysical Systems. Monthly Weather Review, 137(12), 4089-4114. doi:10.1175/2009mwr2835.1 | es_ES |
dc.description.references | Wang, Y., Li, G., & Reynolds, A. C. (2010). Estimation of Depths of Fluid Contacts by History Matching Using Iterative Ensemble-Kalman Smoothers. SPE Journal, 15(02), 509-525. doi:10.2118/119056-pa | es_ES |
dc.description.references | Wen, X.-H., & Chen, W. H. (2006). Real-Time Reservoir Model Updating Using Ensemble Kalman Filter With Confirming Option. SPE Journal, 11(04), 431-442. doi:10.2118/92991-pa | es_ES |
dc.description.references | Wen, X.-H., Deutsch, C. V., & Cullick, A. S. (2002). Construction of geostatistical aquifer models integrating dynamic flow and tracer data using inverse technique. Journal of Hydrology, 255(1-4), 151-168. doi:10.1016/s0022-1694(01)00512-1 | es_ES |
dc.description.references | Wen, X. H., Capilla, J. E., Deutsch, C. V., Gómez-Hernández, J. J., & Cullick, A. S. (1999). A program to create permeability fields that honor single-phase flow rate and pressure data. Computers & Geosciences, 25(3), 217-230. doi:10.1016/s0098-3004(98)00126-5 | es_ES |
dc.description.references | Xu, T., & Gómez‐Hernández, J. J. (2015). Inverse sequential simulation: A new approach for the characterization of hydraulic conductivities demonstrated on a non‐ G aussian field. Water Resources Research, 51(4), 2227-2242. doi:10.1002/2014wr016320 | es_ES |
dc.description.references | Xu, T., & Gómez-Hernández, J. J. (2015). Inverse sequential simulation: Performance and implementation details. Advances in Water Resources, 86, 311-326. doi:10.1016/j.advwatres.2015.04.015 | es_ES |
dc.description.references | Xu, T., Jaime Gómez-Hernández, J., Zhou, H., & Li, L. (2013). The power of transient piezometric head data in inverse modeling: An application of the localized normal-score EnKF with covariance inflation in a heterogenous bimodal hydraulic conductivity field. Advances in Water Resources, 54, 100-118. doi:10.1016/j.advwatres.2013.01.006 | es_ES |
dc.description.references | Zheng , C. 2010 | es_ES |
dc.description.references | Zhou, H., Gómez-Hernández, J. J., Hendricks Franssen, H.-J., & Li, L. (2011). An approach to handling non-Gaussianity of parameters and state variables in ensemble Kalman filtering. Advances in Water Resources, 34(7), 844-864. doi:10.1016/j.advwatres.2011.04.014 | es_ES |
dc.description.references | Zhou, H., Li, L., Hendricks Franssen, H.-J., & Gómez-Hernández, J. J. (2011). Pattern Recognition in a Bimodal Aquifer Using the Normal-Score Ensemble Kalman Filter. Mathematical Geosciences, 44(2), 169-185. doi:10.1007/s11004-011-9372-3 | es_ES |
dc.description.references | Zhou, H., Gómez-Hernández, J. J., & Li, L. (2014). Inverse methods in hydrogeology: Evolution and recent trends. Advances in Water Resources, 63, 22-37. doi:10.1016/j.advwatres.2013.10.014 | es_ES |