K. Arora, S. K. Mickelson, J. L. Baker, D. P. Tierney, and C. J. Peters, Herbicide Retention by Vegetative Buffer Strips from Runoff under Natural Rainfall, Transactions of the ASAE, vol.39, issue.6, pp.2155-2162, 1996.
DOI : 10.13031/2013.27719

J. Aubertot, J. Barbier, A. Carpentier, J. Gril, L. Guichard et al., Pesticides, agriculture et environnement : réduire l'utilisation des pesticides et limiter leurs impacts environnementaux, 2005.

G. Baroni and S. Tarantola, A general probabilistic framework for uncertainty and global sensitivity analysis of deterministic models : A hydrological case study. Environmental Modelling and Software, pp.26-34, 2014.

J. Bear, Dynamics of Fluids in Porous Media, Soil Science, vol.120, issue.2, 1972.
DOI : 10.1097/00010694-197508000-00022

C. Bedos, P. Cellier, R. Calvet, E. Barriuso, G. et al., Mass transfer of pesticides into the atmosphere by volatilization from soils and plants: overview, Agronomie, vol.22, issue.1, pp.21-33, 2002.
DOI : 10.1051/agro:2001003

L. Bergamaschi and M. Putti, Mixed finite elements and Newton-type linearizations for the solution of Richards' equation, International Journal for Numerical Methods in Engineering, vol.20, issue.8, pp.451025-1046, 1999.
DOI : 10.1007/978-3-7091-2696-7_4

E. Bertolazzi and G. Manzini, A Second-Order Maximum Principle Preserving Finite Volume Method for Steady Convection-Diffusion Problems, SIAM Journal on Numerical Analysis, vol.43, issue.5, pp.2172-2199, 2005.
DOI : 10.1137/040607071

R. P. Betson and J. B. Marius, Source Areas of Storm Runoff, Water Resources Research, vol.XIIe, issue.Annee (3), pp.574-582, 1969.
DOI : 10.1080/02626666709493533

K. Beven, Changing ideas in hydrology ??? The case of physically-based models, Journal of Hydrology, vol.105, issue.1-2, pp.157-172, 1989.
DOI : 10.1016/0022-1694(89)90101-7

K. Beven and P. Germann, Macropores and water flow in soils revisited, Water Resources Research, vol.365, issue.1-2, pp.3071-3092, 2013.
DOI : 10.1098/rstb.2009.0308

K. J. Beven, E. F. Wood, and M. Sivapalan, On hydrological heterogeneity ??? Catchment morphology and catchment response, Journal of Hydrology, vol.100, issue.1-3, pp.1-3353, 1988.
DOI : 10.1016/0022-1694(88)90192-8

J. Boesten and L. Van-der-pas, MODELING ADSORPTION/DESORPTION KINETICS OF PESTICIDES IN A SOIL SUSPENSION, Soil Science, vol.146, issue.4, pp.221-231, 1988.
DOI : 10.1097/00010694-198810000-00002

A. Boivin, Disponibilité spatio-temporelle et transfert des pesticides dans le sol, 2003.

F. Brezzi and M. Fortin, Mixed and Hybrid Finite Element Methods, 15 in Springer Series in Computational Mathematics, 1991.
DOI : 10.1007/978-1-4612-3172-1

P. Brunner, J. Doherty, and C. T. Simmons, Uncertainty assessment and implications for data acquisition in support of integrated hydrologic models, Water Resources Research, vol.35, issue.1, 2012.
DOI : 10.1029/2008GL035655

P. Brunner and C. T. Simmons, HydroGeoSphere: A Fully Integrated, Physically Based Hydrological Model, Ground Water, vol.11, issue.2, pp.170-176, 2012.
DOI : 10.1002/joc.3370110202

M. B. Butts, J. T. Payne, M. Kristensen, and H. Madsen, An evaluation of the impact of model structure on hydrological modelling uncertainty for streamflow simulation, Journal of Hydrology, vol.298, issue.1-4, pp.242-266, 2004.
DOI : 10.1016/j.jhydrol.2004.03.042

F. Campolongo, J. Cariboni, and A. Saltelli, An effective screening design for sensitivity analysis of large models, Environmental Modelling & Software, vol.22, issue.10, pp.1509-1518, 2007.
DOI : 10.1016/j.envsoft.2006.10.004

M. Camporese, C. Paniconi, M. Putti, and S. Orlandini, Surface-subsurface flow modeling with path-based runoff routing, boundary condition-based coupling, and assimilation of multisource observation data, Water Resources Research, vol.18, issue.12, p.2512, 2010.
DOI : 10.1175/JCLI3330.1

M. B. Cardenas and V. A. Zlotnik, Three-dimensional model of modern channel bend deposits, Water Resources Research, vol.38, issue.3, p.1141, 2003.
DOI : 10.1029/2001WR000354

N. Carluer, C. Lauvernet, D. Noll, and R. Munoz-carpena, Defining context-specific scenarios to design vegetated buffer zones that limit pesticide transfer via surface runoff, Science of The Total Environment, vol.575, pp.575701-712, 2017.
DOI : 10.1016/j.scitotenv.2016.09.105

R. F. Carsel and R. S. Parrish, Developing joint probability distributions of soil water retention characteristics, Water Resources Research, vol.44, issue.5, pp.755-769, 1988.
DOI : 10.1016/B978-0-12-348580-9.50018-3

C. Catalogne and L. H. , Guide d'aide á l'implantation des zones tampons pour l'atténuation des transferts de contaminants d'origine agricole, 2016.

M. B. Ceddia, S. R. Vieira, A. L. Villela, L. D. Mota, L. H. Anjos et al., Topography and spatial variability of soil physical properties Sensitivity analysis of transient-MIM HYDRUS-1D : case study related to pesticide fate in soils, Vadose Zone Journal, pp.1064-1079, 2009.

Y. Coquet, Variation of pesticide sorption isotherm in soil at the catchment scale, Pest Management Science, vol.16, issue.1, pp.69-78, 2003.
DOI : 10.2134/jeq1987.00472425001600030012x

Y. Coquet and E. Barriuso, Spatial variability of pesticide adsorption within the topsoil of a small agricultural catchment, Agronomie, vol.22, issue.4, pp.389-398, 2002.
DOI : 10.1051/agro:2002017

Y. Coquet, C. Coutadeur, C. Labat, P. Vachier, M. Van-genuchten et al., Water and solute transport in a cultivated silt loam soil? 1, 2005.

A. T. Corey, Mechanic of Heterogeneous Fluids in Porous Media, Soil Science, vol.125, issue.5, 1977.
DOI : 10.1097/00010694-197805000-00011

C. Coutadeur, Y. Coquet, and J. Roger-estrade, Variation of hydraulic conductivity in a tilled soil, European Journal of Soil Science, vol.4, issue.4, pp.619-628, 2002.
DOI : 10.1029/WR004i006p01259

C. Dagès, C. Paniconi, and M. Sulis, Analysis of coupling errors in a physically-based integrated surface water???groundwater model, Advances in Water Resources, vol.49, pp.86-96, 2012.
DOI : 10.1016/j.advwatres.2012.07.019

R. Dairon, Détermination et amélioration des formalismes de modélisation du transfert des pesticides dans des contextes agro-pedo-climatiques variés, 2017.

C. Dawson, A continuous/discontinuous Galerkin framework for modeling coupled subsurface and surface water flow, Computational Geosciences, vol.15, issue.4, pp.451-472, 2008.
DOI : 10.1007/s10596-008-9085-y

C. Dawson, S. Sun, and M. F. Wheeler, Compatible algorithms for coupled flow and transport, Computer Methods in Applied Mechanics and Engineering, vol.193, issue.23-26, pp.23-262565, 2004.
DOI : 10.1016/j.cma.2003.12.059

J. Delfs, F. Blumensaat, W. Wang, P. Krebs, and O. Kolditz, Coupling hydrogeological with surface runoff model in a Poltva case study in Western Ukraine, Environmental Earth Sciences, vol.37, issue.4, pp.651439-1457, 2012.
DOI : 10.1111/j.1745-6584.1999.tb01147.x

H. Diersch, Feflow reference manual : Interactive, graphics-based finite-element simulation system for modeling groundwater flow, contaminant mass and heat transport processes, 1998.

D. Fread, Flow routing in handbook of hydrology, 1993.

H. Freundlich, Über die adsorption in lösungen, Zeitschrift für physikalische Chemie, pp.385-470, 1907.

G. Gambolati, G. Pini, M. Putti, and C. Paniconi, Finite element modeling of the transport of reactive contaminants in variably saturated soils with lea and non-lea sorption. Environmental modeling Volume 2 : computer methods and software for simulating environmental pollution and its adverse effects, pp.173-212, 1994.

B. Gao, M. Walter, T. Steenhuis, J. Parlange, B. Richards et al., Investigating raindrop effects on transport of sediment and non-sorbed chemicals from soil to surface runoff, Journal of Hydrology, vol.308, issue.1-4, pp.313-320, 2005.
DOI : 10.1016/j.jhydrol.2004.11.007

B. Gao, M. T. Walter, T. S. Steenhuis, W. L. Hogarth, and J. Parlange, Rainfall induced chemical transport from soil to runoff : theory and experiments, Journal of Hydrology, vol.295, pp.1-4291, 2004.

L. Gatel, C. Lauvernet, N. Carluer, and C. Paniconi, Effect of surface and subsurface heterogeneity on the hydrological response of a grassed buffer zone, Journal of Hydrology, vol.542, pp.637-647, 2016.
DOI : 10.1016/j.jhydrol.2016.09.038

J. Gaudet, H. Jegat, G. Vachaud, and P. Wierenga, Solute Transfer, with Exchange between Mobile and Stagnant Water, through Unsaturated Sand1, Soil Science Society of America Journal, vol.41, issue.4, pp.665-671, 1977.
DOI : 10.2136/sssaj1977.03615995004100040009x

L. W. Gelhar, C. Welty, R. , and K. R. , A critical review of data on field-scale dispersion in aquifers, Water Resources Research, vol.16, issue.6, pp.1955-1974, 1992.
DOI : 10.1111/j.1745-6584.1978.tb03253.x

H. H. Gerke and M. T. Van-genuchten, A dual-porosity model for simulating the preferential movement of water and solutes in structured porous media, Water Resources Research, vol.29, issue.3, pp.305-319, 1993.
DOI : 10.1029/WR026i006p01133

H. H. Gerke and M. T. Van-genuchten, Macroscopic representation of structural geometry for simulating water and solute movement in dual-porosity media, Advances in Water Resources, vol.19, issue.6, pp.343-357, 1996.
DOI : 10.1016/0309-1708(96)00012-7

M. N. Goltz, P. V. Roberts, A. I. Gärdenäs, J. ?im?nek, N. Jarvis et al., Interpreting organic solute transport data from a field experiment using physical nonequilibrium models, Journal of Contaminant Hydrology, vol.1, issue.1-2, pp.77-647, 1986.
DOI : 10.1016/0169-7722(86)90008-2

C. Guay, M. Nastev, C. Paniconi, and M. Sulis, Comparison of two modeling approaches for groundwater-surface water interactions, Hydrological Processes, vol.42, issue.3, pp.272258-2270, 2013.
DOI : 10.1007/s00254-002-0582-3

H. V. Gupta and H. Kling, On typical range, sensitivity, and normalization of Mean Squared Error and Nash-Sutcliffe Efficiency type metrics, Water Resources Research, vol.181, issue.1-4, p.47, 2011.
DOI : 10.1016/0022-1694(95)02918-4

H. V. Gupta, H. Kling, K. K. Yilmaz, and G. F. Martinez, Decomposition of the mean squared error and NSE performance criteria: Implications for improving hydrological modelling, Journal of Hydrology, vol.377, issue.1-2, pp.80-91, 2009.
DOI : 10.1016/j.jhydrol.2009.08.003

A. B. Gureghian, TRIPM : Two-dimensional Finite-element Model for the Simultaneous Transport of Water and Reacting Solutes Through Saturated and Unsaturated Porous Media, 1983.

M. A. Hardie, R. B. Doyle, W. E. Cotching, and S. Lisson, Subsurface Lateral Flow in Texture-Contrast (Duplex) Soils and Catchments with Shallow Bedrock, Applied and Environmental Soil Science, vol.35, issue.1, p.10, 2012.
DOI : 10.1016/j.jhydrol.2010.03.008

J. Herman, J. Kollat, P. Reed, and T. Wagener, Method of Morris effectively reduces the computational demands of global sensitivity analysis for distributed watershed models, Hydrology and Earth System Sciences, issue.7, pp.172893-2903, 2013.

K. Holvoet, A. Van-griensven, P. Seuntjens, and P. Vanrolleghem, Sensitivity analysis for hydrology and pesticide supply towards the river in SWAT, Physics and Chemistry of the Earth, Parts A/B/C, vol.30, issue.8-10, pp.518-526, 2005.
DOI : 10.1016/j.pce.2005.07.006

R. E. Horton, The R??le of infiltration in the hydrologic cycle, Transactions, American Geophysical Union, vol.14, issue.1, pp.446-460, 1933.
DOI : 10.1029/TR014i001p00446

J. Hussein, B. Yu, H. Ghadiri, R. , and C. , Prediction of surface flow hydrology and sediment retention upslope of a vetiver buffer strip, Journal of Hydrology, vol.338, issue.3-4, pp.261-272, 2007.
DOI : 10.1016/j.jhydrol.2007.02.038

P. S. Huyakorn, J. W. Mercer, and D. S. Ward, Finite Element Matrix and Mass Balance Computational Schemes for Transport in Variably Saturated Porous Media, Water Resources Research, vol.17, issue.3, 1985.
DOI : 10.2172/6552234

P. S. Huyakorn, E. P. Springer, V. Guvanasen, W. , and T. D. , A three-dimensional finite-element model for simulating water flow in variably saturated porous media, Water Resources Research, vol.12, issue.2, pp.1790-1808, 1986.
DOI : 10.2172/1083951

V. Y. Ivanov, E. R. Vivoni, R. L. Bras, and D. Entekhabi, Catchment hydrologic response with a fully distributed triangulated irregular network model, Water Resources Research, vol.95, issue.11, p.40, 2004.
DOI : 10.1029/JD095iD03p02143

J. Jacques, C. Lavergne, and N. Devictor, Sensitivity analysis in presence of model uncertainty and correlated inputs, Reliability Engineering & System Safety, vol.91, issue.10-11, pp.911126-1134, 2006.
DOI : 10.1016/j.ress.2005.11.047
URL : https://hal.archives-ouvertes.fr/hal-00194061

S. K. Jain and K. Sudheer, Fitting of Hydrologic Models: A Close Look at the Nash???Sutcliffe Index, Journal of Hydrologic Engineering, vol.13, issue.10, pp.981-986, 2008.
DOI : 10.1061/(ASCE)1084-0699(2008)13:10(981)

M. J. Jansen, Analysis of variance designs for model output, Computer Physics Communications, vol.117, issue.1-2, pp.35-43, 1999.
DOI : 10.1016/S0010-4655(98)00154-4

N. J. Jarvis, A review of non-equilibrium water flow and solute transport in soil macropores: principles, controlling factors and consequences for water quality, European Journal of Soil Science, vol.28, issue.3, pp.523-546, 2007.
DOI : 10.1016/S0022-1694(01)00371-7

M. Javaux and M. Vanclooster, In Situ Long-Term Chloride Transport through a Layered, Nonsaturated Subsoil. 1. Data Set, Interpolation Methodology, and Results, Vadose Zone Journal, vol.3, issue.4, pp.1322-1330, 2004.
DOI : 10.2136/vzj2004.1322

M. Javaux and M. Vanclooster, In Situ Long-Term Chloride Transport through a Layered, Nonsaturated Subsoil. 2. Effect of Layering on Solute Transport Processes, Vadose Zone Journal, vol.3, issue.4, pp.1331-1339, 2004.
DOI : 10.2136/vzj2004.1331

S. K. Kampf and S. J. Burges, Parameter estimation for a physics-based distributed hydrologic model using measured outflow fluxes and internal moisture states, Water Resources Research, vol.65, issue.12, p.43, 2007.
DOI : 10.2136/sssaj2001.653655x

C. Kao, C. Akkerman, I. Farthing, M. Bazilevs, and Y. , Fonctionnement hydraulique des nappes superficielles de fonds de vallées en interaction Kees A conservative level set method suitable for variable-order approximations and unstructured meshes, Journal of Computational Physics, issue.12, pp.2304536-4558, 2002.

R. A. Klausen and T. Russell, Relationships among some locally conservative discretization methods which handle discontinuous coefficients, Computational Geosciences, vol.6, issue.4, pp.341-377, 2004.
DOI : 10.1137/1.9781611971071.ch2

A. Klute and C. Dirksen, Hydraulic conductivity and diffusivity : laboratory methods. Methods of soil analysis : part 1?physical and mineralogical methods, pp.687-734, 1986.

J. M. Koehne, S. Kohne, and J. Simunek, A review of model applications for structured soils: b) Pesticide transport, Journal of Contaminant Hydrology, vol.104, issue.1-4, pp.36-60, 2009.
DOI : 10.1016/j.jconhyd.2008.10.003

S. Kollet, M. Sulis, R. M. Maxwell, C. Paniconi, M. Putti et al., The integrated hydrologic model intercomparison project, IH-MIP2: A second set of benchmark results to diagnose integrated hydrology and feedbacks, Water Resources Research, vol.53, issue.2, pp.867-890, 2017.
DOI : 10.1007/s00267-013-0220-8

S. J. Kollet and R. M. Maxwell, Integrated surface???groundwater flow modeling: A free-surface overland flow boundary condition in a parallel groundwater flow model, Advances in Water Resources, vol.29, issue.7, pp.29945-958, 2006.
DOI : 10.1016/j.advwatres.2005.08.006

S. J. Kollet and V. A. Zlotnik, Stream depletion predictions using pumping test data from a heterogeneous stream???aquifer system (a case study from the Great Plains, USA), Journal of Hydrology, vol.281, issue.1-2, pp.96-114, 2003.
DOI : 10.1016/S0022-1694(03)00203-8

P. Krause, D. P. Boyle, and F. Bäse, Comparison of different efficiency criteria for hydrological model assessment, Advances in Geosciences, vol.5, pp.89-97, 2005.
DOI : 10.5194/adgeo-5-89-2005
URL : https://hal.archives-ouvertes.fr/hal-00296842

M. Kutílek and D. R. Nielsen, Soil hydrology : texbook for students of soil science, agriculture, forestry, geoecology, hydrology, geomorphology and other related disciplines, 1994.

J. Lacas, Processus de dissipation des produits phytosanitaires dans les zones tampons enherbées : étude expérimentale et modélisation en vue de limiter la contamination des eaux de surface, 2005.

J. Lacas, N. Carluer, and M. Voltz, Efficiency of a Grass Buffer Strip for Limiting Diuron Losses from an Uphill Vineyard Towards Surface and Subsurface Waters, Pedosphere, vol.22, issue.4, pp.580-592, 2012.
DOI : 10.1016/S1002-0160(12)60043-5

J. Lacas, M. Voltz, V. Gouy, N. Carluer, and J. Gril, Using grassed strips to limit pesticide transfer to surface water : a review, Agronomy for Sustainable Development, pp.253-266, 2005.
URL : https://hal.archives-ouvertes.fr/hal-00886289

I. Langmuir, THE ADSORPTION OF GASES ON PLANE SURFACES OF GLASS, MICA AND PLATINUM., Journal of the American Chemical Society, vol.40, issue.9, pp.1361-1403, 1918.
DOI : 10.1021/ja02242a004

M. Larsbo and N. Jarvis, MACRO 5.0 : a model of water flow and solute transport in macroporous soil : technical description, 2003.

M. Larsbo and N. Jarvis, Simulating Solute Transport in a Structured Field Soil, Journal of Environment Quality, vol.34, issue.2, pp.621-634, 2005.
DOI : 10.2134/jeq2005.0621

M. G. Larson and A. Niklasson, A conservative flux for the continuous galerkin method based on discontinuous enrichment, Calcolo, vol.20, issue.2, pp.65-76, 2004.
DOI : 10.1007/978-1-4757-4338-8

C. Lauvernet, M. Carpena, and R. , Shallow water table effects on water, sediment and pesticide transport in vegetative filter strips : Part b. model coupling, application, factor importance and uncertainty, Hydrology and Earth System Sciences Discussions, pp.1-31, 2017.

L. Potier and C. , Sch??ma volumes finis monotone pour des op??rateurs de diffusion fortement anisotropes sur des maillages de triangles non structur??s, Comptes Rendus Mathematique, vol.341, issue.12, pp.341787-792, 2005.
DOI : 10.1016/j.crma.2005.10.010

T. Lenhart, K. Eckhardt, N. Fohrer, and H. Frede, Comparison of two different approaches of sensitivity analysis, Physics and Chemistry of the Earth, Parts A/B/C, vol.27, issue.9-10, pp.9-10645, 2002.
DOI : 10.1016/S1474-7065(02)00049-9

R. W. Malone, L. R. Ahuja, L. Ma, D. Wauchope, R. Ma et al., Application of the root zone water quality model (rzwqm) to pesticide fate and transport : an overview. Pest Management Science, pp.205-221, 2004.

J. Martinez, Analyse de sensibilité globale par décomposition de la variance. Presentation in, Journée des GdR Ondes & Mascot, issue.13, 2011.

R. M. Maxwell, M. Putti, S. Meyerhoff, J. Delfs, I. M. Ferguson et al., Surface-subsurface model intercomparison : A first set of benchmark results to diagnose integrated hydrology and feedbacks Godunov mixed methods on triangular grids for advection?dispersion equations, Water Resources Computational Geosciences, vol.6, issue.2, pp.123-139, 2002.

A. Mazzia, L. Bergamaschi, and M. Putti, A Time-Splitting Technique for the Advection-Dispersion Equation in Groundwater, Journal of Computational Physics, vol.157, issue.1, pp.181-198, 2000.
DOI : 10.1006/jcph.1999.6370

A. Mazzia, L. Bergamaschi, and M. Putti, On the reliability of numerical solutions of brine transport in groundwater : Analysis of infiltration from a salt lake, Transport in Porous Media, pp.65-86, 2001.

A. Mazzia, G. Manzini, and M. Putti, Bad behavior of Godunov mixed methods for strongly anisotropic advection???dispersion equations, Journal of Computational Physics, vol.230, issue.23, pp.8410-8426, 2011.
DOI : 10.1016/j.jcp.2011.07.021

A. Mazzia and M. Putti, High order Godunov mixed methods on tetrahedral meshes for density driven flow simulations in porous media, Journal of Computational Physics, vol.208, issue.1, pp.154-174, 2005.
DOI : 10.1016/j.jcp.2005.01.029

R. H. Mccuen, Z. Knight, and A. G. Cutter, Evaluation of the Nash???Sutcliffe Efficiency Index, Journal of Hydrologic Engineering, vol.11, issue.6, pp.597-602, 2006.
DOI : 10.1061/(ASCE)1084-0699(2006)11:6(597)

P. Meyer, M. Rockhold, and G. Gee, Uncertainty analyses of infiltration and subsurface flow and transport for sdmp sites, Div. of Regulatory Applications ; Pacific Northwest National Lab, 1997.
DOI : 10.2172/541818

B. P. Mohanty, M. D. Ankeny, R. Horton, and R. S. Kanwar, Spatial analysis of hydraulic conductivity measured using disc infiltrometers, Water Resources Research, vol.51, issue.6, pp.2489-2498, 1994.
DOI : 10.2136/sssaj1987.03615995005100060032x

M. D. Morris, Factorial Sampling Plans for Preliminary Computational Experiments, Technometrics, vol.1, issue.2, pp.161-174, 1991.
DOI : 10.2307/1266468

Y. Mualem, A new model for predicting the hydraulic conductivity of unsaturated porous media, Water Resources Research, vol.12, issue.4, pp.513-522, 1976.
DOI : 10.2136/sssaj1966.03615995003000020008x

M. K. Muleta and J. W. Nicklow, Sensitivity and uncertainty analysis coupled with automatic calibration for a distributed watershed model, Journal of Hydrology, vol.306, issue.1-4, pp.1-4127, 2005.
DOI : 10.1016/j.jhydrol.2004.09.005

D. Mulla and A. Mcbratney, Soil spatial variability. Soil physics companion, p.343, 2010.

M. Muma, S. Gumiere, and A. Rousseau, Sensitivity analysis of the cathy distributed hydrological model to soil hydrodynamic properties of a tile-drained agricultural microwatershed, Hydrological Sciences Journal, vol.1, p.7, 2011.

R. Muñoz-carpena, G. A. Fox, and G. J. Sabbagh, Parameter Importance and Uncertainty in Predicting Runoff Pesticide Reduction with Filter Strips, Journal of Environment Quality, vol.39, issue.2, pp.630-641, 2010.
DOI : 10.2134/jeq2009.0300

R. Muñoz-carpena, C. Lauvernet, and N. Carluer, Shallow water table effects on water, sediment and pesticide transport in vegetative filter strips: Part A. non-uniform infiltration and soil water redistribution, Hydrology and Earth System Sciences Discussions, pp.1-32, 2017.
DOI : 10.5194/hess-2017-405-AC5

R. Muñoz-carpena, J. E. Parsons, and J. W. Gilliam, Modeling hydrology and sediment transport in vegetative filter strips, Journal of Hydrology, vol.214, issue.1-4, pp.1-4111, 1999.
DOI : 10.1016/S0022-1694(98)00272-8

A. Musy and M. Soutter, Physique du sol, 1991.

J. Nash and J. Sutcliffe, River flow forecasting through conceptual models part I ??? A discussion of principles, Journal of Hydrology, vol.10, issue.3, pp.282-290, 1970.
DOI : 10.1016/0022-1694(70)90255-6

P. Nicholls and D. Hall, Use of the pesticide leaching model (PLM) to simulate pesticide movement through macroporous soils, 1995.

S. Orlandini, G. Moretti, M. Franchini, B. Aldighieri, and B. Testa, Path-based methods for the determination of nondispersive drainage directions in grid-based digital elevation models, Water Resources Research, vol.33, issue.6, p.1144, 2003.
DOI : 10.1029/96WR03137

S. Orlandini and R. Rosso, Diffusion Wave Modeling of Distributed Catchment Dynamics, Journal of Hydrologic Engineering, vol.1, issue.3, pp.103-113, 1996.
DOI : 10.1061/(ASCE)1084-0699(1996)1:3(103)

S. L. Painter, E. T. Coon, A. L. Atchley, M. Berndt, R. Garimella et al., Integrated surface/subsurface permafrost thermal hydrology: Model formulation and proof-of-concept simulations, Water Resources Research, vol.18, issue.4, pp.526062-6077, 2016.
DOI : 10.1111/j.1365-2486.2011.02587.x

S. Panday and P. S. Huyakorn, A fully coupled physically-based spatially-distributed model for evaluating surface/subsurface flow, Advances in Water Resources, vol.27, issue.4, pp.361-382, 2004.
DOI : 10.1016/j.advwatres.2004.02.016

L. A. Pangle, S. B. Delong, N. Abramson, J. Adams, G. A. Barron-gafford et al., The Landscape Evolution Observatory: A large-scale controllable infrastructure to study coupled Earth-surface processes, Geomorphology, vol.244, 2015.
DOI : 10.1016/j.geomorph.2015.01.020

C. Paniconi, M. Marrocu, M. Putti, and M. Verbunt, Newtonian nudging for a Richards equation-based distributed hydrological model, Advances in Water Resources, vol.26, issue.2, pp.161-178, 2003.
DOI : 10.1016/S0309-1708(02)00099-4

C. Paniconi and M. Putti, A comparison of Picard and Newton iteration in the numerical solution of multidimensional variably saturated flow problems, Water Resources Research, vol.3, issue.5, pp.3357-3374, 1994.
DOI : 10.1137/0913035

P. Anguela and T. , Détermination expérimentale des propriétés hydrodynamiques au voisinage de la saturation : Incidence sur le fonctionnement hydrique d, 2001.

P. Anguela and T. , Etude du transfert d'eau et de solutés dans un sol à nappe superficielle drainée artificiellement, 2004.

D. Pasetto, M. Camporese, and M. Putti, Ensemble Kalman filter versus particle filter for a physically-based coupled surface???subsurface model, Advances in Water Resources, vol.47, pp.1-13, 2012.
DOI : 10.1016/j.advwatres.2012.06.009

M. C. Peel, B. L. Finlayson, and T. A. Mcmahon, Updated world map of the K??ppen-Geiger climate classification, Hydrology and Earth System Sciences, vol.11, issue.5, pp.1633-1644, 2007.
DOI : 10.5194/hess-11-1633-2007-supplement

D. Persicani, Pesticide leaching into field soils: sensitivity analysis of four mathematical models, Ecological Modelling, vol.84, issue.1-3, pp.265-280, 1996.
DOI : 10.1016/0304-3800(94)00136-7

X. Peyrard, Transfert de produits phytosanitaires par les écoulements latéraux en proche surface dans le Beaujolais de coteaux : suivi sur parcelle exploitée, expérimentation de traçage in situ et modélisation, 2016.

N. Poletika, P. Coody, G. Fox, G. Sabbagh, S. Dolder et al., Chlorpyrifos and Atrazine Removal from Runoff by Vegetated Filter Strips: Experiments and Predictive Modeling, Journal of Environment Quality, vol.38, issue.3, pp.1042-1052, 2009.
DOI : 10.2134/jeq2008.0404

T. J. Povich, C. N. Dawson, M. W. Farthing, and C. E. Kees, Finite element methods for variable density flow and solute transport, Computational Geosciences, vol.25, issue.1, pp.529-549, 2013.
DOI : 10.1016/S0309-1708(01)00059-8

Y. Qu and C. J. Duffy, A semidiscrete finite volume formulation for multiprocess watershed simulation, Water Resources Research, vol.133, issue.4, 2007.
DOI : 10.1061/(ASCE)1084-0699(2004)9:4(288)

P. Randriambololohasinirina, Pesticide dissipation properties in soils of a wine-growing watershed, 2012.

W. J. Rawls, D. Brakensiek, and K. Saxtonn, Estimation of Soil Water Properties, Transactions of the ASAE, vol.25, issue.5, pp.1316-1320, 1982.
DOI : 10.13031/2013.33720

H. Rüdel, Volatilisation of pesticides from soil and plant surfaces, Chemosphere, vol.35, issue.1-2, pp.143-152, 1997.
DOI : 10.1016/S0045-6535(97)00146-X

P. Renard and G. De-marsily, Calculating equivalent permeability: a review, Advances in Water Resources, vol.20, issue.5-6, pp.253-278, 1997.
DOI : 10.1016/S0309-1708(96)00050-4

W. Reynolds and D. Elrick, Determination of Hydraulic Conductivity Using a Tension Infiltrometer, Soil Science Society of America Journal, vol.55, issue.3, pp.633-639, 1991.
DOI : 10.2136/sssaj1991.03615995005500030001x

R. Rigon, G. Bertoldi, and T. M. Over, GEOtop: A Distributed Hydrological Model with Coupled Water and Energy Budgets, Journal of Hydrometeorology, vol.7, issue.3, pp.371-388, 2006.
DOI : 10.1175/JHM497.1

A. Ritter and R. Munoz-carpena, Performance evaluation of hydrological models: Statistical significance for reducing subjectivity in goodness-of-fit assessments, Journal of Hydrology, vol.480, pp.33-45, 2013.
DOI : 10.1016/j.jhydrol.2012.12.004

A. Rubio, A. Zalts, and C. E. Hasi, Numerical solution of the advection???reaction???diffusion equation at different scales, Environmental Modelling & Software, vol.23, issue.1, pp.90-95, 2008.
DOI : 10.1016/j.envsoft.2007.05.009

A. B. Saint-venant, Théorie du mouvement non permanent des eaux, avec application aux crues des riviéres et á l'introduction des marées dans leurs lits, Comptes Rendus des séances de l'Académie des Sciences, pp.237-240, 1871.

A. Saltelli, P. Annoni, I. Azzini, F. Campolongo, M. Ratto et al., Variance based sensitivity analysis of model output. Design and estimator for the total sensitivity index, Computer Physics Communications, vol.181, issue.2, pp.259-270, 2010.
DOI : 10.1016/j.cpc.2009.09.018

A. Saltelli, M. Ratto, T. Andres, F. Campolongo, J. Cariboni et al., Global Sensitivity Analysis : The Primer, 2008.
DOI : 10.1002/9780470725184

A. Saltelli, M. Ratto, S. Tarantola, C. , and F. , Sensitivity Analysis for Chemical Models, Chemical Reviews, vol.105, issue.7, pp.2811-2828, 2005.
DOI : 10.1021/cr040659d

A. Saltelli, S. Tarantola, F. Campolongo, and M. Ratto, Sensitivity Analysis in Practice : a guide to assessing scientific models, 2004.
DOI : 10.1002/0470870958

B. Schaefli, H. V. Gupta, P. R. Dozier, T. S. Zappi, P. A. Mcenroe et al., Do Nash values have value ? Hydrological Processes, 1994.

A. Schwen, G. Bodner, P. Scholl, G. D. Buchan, and W. Loiskandl, Temporal dynamics of soil hydraulic properties and the water-conducting porosity under different tillage, Soil and Tillage Research, vol.113, issue.2, pp.89-98, 2011.
DOI : 10.1016/j.still.2011.02.005

C. Scudeler, L. Pangle, D. Pasetto, G. Niu, T. Volkmann et al., Multiresponse modeling of variably saturated flow and isotope tracer transport for a hillslope experiment at the Landscape Evolution Observatory, Hydrology and Earth System Sciences, pp.204061-4078, 2016.
DOI : 10.5194/hess-20-4061-2016

C. Scudeler, M. Putti, and C. Paniconi, Mass-conservative reconstruction of Galerkin velocity fields for transport simulations, Advances in Water Resources, vol.94, pp.470-485, 2016.
DOI : 10.1016/j.advwatres.2016.06.011

M. L. Sebben, A. D. Werner, J. E. Liggett, D. Partington, and C. T. Simmons, On the testing of fully integrated surface-subsurface hydrological models, Hydrological Processes, vol.23, issue.11, pp.271276-1285, 2013.
DOI : 10.1007/s11269-008-9377-y

C. Shen and M. S. Phanikumar, A process-based, distributed hydrologic model based on a large-scale method for surface???subsurface coupling, Advances in Water Resources, vol.33, issue.12, pp.331524-1541, 2010.
DOI : 10.1016/j.advwatres.2010.09.002

J. Simunek, M. T. Van-genuchten, and M. Sejna, The hydrus-1d software package for simulating the one-dimensional movement of water, heat, and multiple solutes in variablysaturated media, pp.1-240, 2005.

J. Simunek, M. T. Van-genuchten, and M. Sejna, Development and Applications of the HYDRUS and STANMOD Software Packages and Related Codes, Vadose Zone Journal, vol.7, issue.2, pp.587-600, 2008.
DOI : 10.2136/vzj2007.0077

K. A. Smith and C. Mullins, Soil analysis : Physical Methods, p.7, 1991.

I. M. Sobol, Sensitivity estimates for nonlinear mathematical models, Mathematical Modelling and Computational Experiments, vol.1, issue.4, pp.407-414, 1993.

I. M. Sobol, S. Tarantola, D. Gatelli, S. Kucherenko, and W. Mauntz, Estimating the approximation error when fixing unessential factors in global sensitivity analysis, Reliability Engineering & System Safety, vol.92, issue.7, pp.92957-960, 2007.
DOI : 10.1016/j.ress.2006.07.001

M. Sulis, S. B. Meyerhoff, C. Paniconi, R. M. Maxwell, M. Putti et al., A comparison of two physics-based numerical models for simulating surface water???groundwater interactions, Advances in Water Resources, vol.33, issue.4, pp.456-467, 2010.
DOI : 10.1016/j.advwatres.2010.01.010

M. Sulis, C. Paniconi, C. Rivard, R. Harvey, C. et al., Assessment of climate change impacts at the catchment scale with a detailed hydrological model of surface-subsurface interactions and comparison with a land surface model, Water Resources Research, vol.37, issue.4, 2011.
DOI : 10.1029/2000WR900357

A. Taylor and W. Spencer, Volatilization and vapor transport processes. Pesticides in the Soil Environment : Processes, Impacts and Modeling, pp.213-269, 1990.

J. Tissot and C. Prieur, A randomized orthogonal array-based procedure for the estimation of first- and second-order Sobol' indices, Journal of Statistical Computation and Simulation, vol.3, issue.2, pp.1358-1381, 2015.
DOI : 10.1214/aos/1069362310
URL : https://hal.archives-ouvertes.fr/hal-00743964

M. Trudel, R. Leconte, and C. Paniconi, Analysis of the hydrological response of a distributed physically-based model using post-assimilation (EnKF) diagnostics of streamflow and in situ soil moisture observations, Journal of Hydrology, vol.514, pp.192-201, 2014.
DOI : 10.1016/j.jhydrol.2014.03.072

R. Van-den-bogaert, Typologie des sols du bassin versant de la morcille, caracteristation de leurs proprietes hydrauliques et test de fonctions de pedotranfert, 2011.

M. T. Van-genuchten, A Closed-form Equation for Predicting the Hydraulic Conductivity of Unsaturated Soils1, Soil Science Society of America Journal, vol.44, issue.5, pp.892-898, 1980.
DOI : 10.2136/sssaj1980.03615995004400050002x

I. Van-wesenbeeck and R. Kachanoski, Effect of Variable Horizon Thickness on Solute Transport, Soil Science Society of America Journal, vol.58, issue.5, pp.1307-1316, 1994.
DOI : 10.2136/sssaj1994.03615995005800050005x

J. Vanderborght and H. Vereecken, Review of Dispersivities for Transport Modeling in Soils, Vadose Zone Journal, vol.6, issue.1, pp.29-52, 2007.
DOI : 10.2136/vzj2006.0096

J. Vanderkwaak and E. Sudicky, Application of a physically-based numerical model of surface and subsurface water flow and solute transport, IAHS PUBLICATION, pp.515-523, 2000.

J. E. Vanderkwaak and K. Loague, Hydrologic-Response simulations for the R-5 catchment with a comprehensive physics-based model, Water Resources Research, vol.23, issue.4, pp.999-1013, 2001.
DOI : 10.1016/0169-7722(95)00099-2

G. Vellidis, R. Lowrance, P. Gay, and R. Wauchope, HERBICIDE TRANSPORT IN A RESTORED RIPARIAN FOREST BUFFER SYSTEM, Transactions of the ASAE, vol.45, issue.1, p.89, 2002.
DOI : 10.13031/2013.7878

T. Vogel and M. Cislerova, On the reliability of unsaturated hydraulic conductivity calculated from the moisture retention curve. Transport in porous media, pp.1-15, 1988.

T. Vogel, M. T. Van-genuchten, and M. Cislerova, Effect of the shape of the soil hydraulic functions near saturation on variably-saturated flow predictions, Advances in Water Resources, vol.24, issue.2, pp.133-144, 2000.
DOI : 10.1016/S0309-1708(00)00037-3

A. Walker, A Simulation Model for Prediction of Herbicide Persistence1, Journal of Environment Quality, vol.3, issue.4, pp.396-401, 1974.
DOI : 10.2134/jeq1974.00472425000300040021x

R. Wallach, G. Grigorin, and J. And-rivlin, A comprehensive mathematical model for transport of soil-dissolved chemicals by overland flow, Journal of Hydrology, vol.247, issue.1-2, pp.85-99, 2001.
DOI : 10.1016/S0022-1694(01)00365-1

R. Wallach and R. Shabtai, Surface runoff contamination by chemicals initially incorporated below the soil surface, Water Resources Research, vol.29, issue.3, pp.697-704, 1993.
DOI : 10.13031/2013.31089

M. T. Walter, B. Gao, and J. Parlange, Modeling soil solute release into runoff with infiltration, Journal of Hydrology, vol.347, issue.3-4, pp.430-437, 2007.
DOI : 10.1016/j.jhydrol.2007.09.033

R. D. Wauchope, K. W. Rojas, L. R. Ahuja, Q. Ma, R. W. Malone et al., Documenting the pesticide processes module of the ARS RZWQM agroecosystem model, Pest Management Science, vol.60, issue.3, pp.222-239, 2004.
DOI : 10.1002/ps.814

R. D. Wauchope, S. Yeh, J. B. Linders, R. Kloskowski, K. Tanaka et al., Pesticide soil sorption parameters: theory, measurement, uses, limitations and reliability, Pest Management Science, vol.15, issue.Suppl 2, pp.419-445, 2002.
DOI : 10.1002/ps.2780150103

S. Weill, A. Mazzia, M. Putti, and C. Paniconi, Coupling water flow and solute transport into a physically-based surface???subsurface hydrological model, Advances in Water Resources, vol.34, issue.1, pp.128-136, 2011.
DOI : 10.1016/j.advwatres.2010.10.001
URL : https://hal.archives-ouvertes.fr/hal-00956816

G. Wind, Capillary conductivity data estimated by a simple method, 1966.

R. Wooding, A hydraulic model for the catchment-stream problem, Journal of Hydrology, vol.3, issue.3-4, pp.254-267, 1965.
DOI : 10.1016/0022-1694(65)90084-3

C. Xu and G. Z. Gertner, Uncertainty and sensitivity analysis for models with correlated parameters, Reliability Engineering & System Safety, vol.93, issue.10, pp.931563-1573, 2008.
DOI : 10.1016/j.ress.2007.06.003

J. Yang, Convergence and uncertainty analyses in monte-carlo based sensitivity analysis. Environmental Modelling and Software, pp.444-457, 2011.

G. Yeh, Numerical Methods for Advection-Dominant Transport, Computational Subsurface Hydrology, pp.93-198, 2000.
DOI : 10.1007/978-1-4615-4371-8_3

X. Zhang, L. Norton, T. Lei, and M. Nearing, COUPLING MIXING ZONE CONCEPT WITH CONVECTION-DIFFUSION EQUATION TO PREDICT CHEMICAL TRANSFER TO SURFACE RUNOFF, Transactions of the ASAE, vol.42, issue.4, p.987, 1999.
DOI : 10.13031/2013.13280

X. C. Zhang, D. Norton, and M. A. Nearing, Chemical transfer from soil solution to surface runoff, Water Resources Research, vol.32, issue.2, pp.809-815, 1997.
DOI : 10.13031/2013.31089

J. Zhou, G. Cheng, X. Li, B. X. Hu, W. et al., Numerical Modeling of Wheat Irrigation using Coupled HYDRUS and WOFOST Models, Soil Science Society of America Journal, vol.76, issue.2, pp.648-662, 2012.
DOI : 10.2136/sssaj2010.0467