P. Bratley and B. L. Niederreiter, Implementation and tests of lowdiscrepancy sequences, ACM Trans. Model. Comput. Simul, vol.2, issue.3, pp.195-213, 1992.

A. Dey, On the construction of nested orthogonal arrays. Australas, J. Combin, vol.54, pp.37-48, 2012.

J. Franco, O. Vasseur, N. Corre, and M. Sergent, Minimum spanning tree: A new approach to assess the quality of the design of computer experiments, Chemom. Intell. Lab. Syst, vol.97, issue.2, pp.164-169, 2009.
URL : https://hal.archives-ouvertes.fr/hal-00409737

L. Gilquin, L. A. Rugama, E. Arnaud, F. J. Hickernell, H. Monod et al., Iterative construction of replicated designs based on Sobol' sequences, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01349444

A. S. Hedayat, N. J. Sloane, and J. Stufken, Orthogonal Arrays: Theory and Applications, 1999.

W. Hoeffding, A class of statistics with asymptotically normal distributions, Annals of Mathematical Statistics, vol.19, issue.3, pp.293-325, 1948.

, Version preprint Comment citer ce document

L. Gilquin, E. Arnaud, C. Prieur, and H. Monod, Recursive estimation procedure of Sobol' indices based on replicated designs, Journal of Statistical Planning and Inference, vol.25, issue.16, pp.1-28, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01291769

A. Janon, T. Klein, A. Lagnoux, M. Nodet, and C. Prieur, Asymptotic normality and efficiency of two Sobol' index estimators, ESAIM Probab. Stat, vol.18, pp.342-364, 2014.
URL : https://hal.archives-ouvertes.fr/hal-00665048

M. E. Jonshon, L. M. Moore, and D. Ylvisaker, Minmax and maximin distance designs, J. Statist. Plann. Inference, vol.26, issue.2, pp.131-148, 1990.

T. A. Mara and O. R. Joseph, Comparison of some efficient methods to evaluate the main effect of computer model factors, Journal of Statistical Computation and Simulation, vol.78, issue.2, pp.167-178, 2008.
URL : https://hal.archives-ouvertes.fr/hal-01093033

M. D. Mckay, W. J. Conover, and R. J. Beckman, A comparison of three methods for selecting values of input variables in the analysis of output from a computer code, Technometrics, vol.21, pp.239-245, 1979.

H. Monod, C. Naud, and D. Makowski, Uncertainty and sensitivity analysis for crop models, pp.55-100, 2006.

W. J. Morokoff and R. E. Caflisch, Quasi-random sequences and their discrepancies, SIAM J. Sci. Comput, vol.15, issue.16, p.12511279, 1994.

A. B. Owen, Better estimation of small Sobol' sensitivity indices, ACM Trans. Model. Comput. Simul, vol.23, issue.2, p.11, 2013.

P. Z. Qian, Nested Latin hypercube designs, Biometrika, vol.96, issue.4, pp.957-970, 2009.

P. Z. Qian, M. Ai, and C. F. Wu, Construction of nested space-filling designs, Ann. Stat, vol.37, issue.6A, pp.3616-3643, 2009.

P. Z. Qian, B. Tang, and C. F. Wu, Nested space-filling designs for computer experiments with two levels of accuracy, Stat. Sinica, vol.19, pp.287-300, 2009.

A. Saltelli, Making best use of models evaluations to compute sensitivity indices, Comput. Phys. Commun, vol.145, issue.2, pp.280-297, 2002.

A. Saltelli, K. Chan, and E. M. Scott, , 2008.

&. Sobol and I. M. , Sensitivity indices for nonlinear mathematical models, Mathematical Modeling and Computational Experiment, vol.1, pp.407-414, 1993.

D. R. Stinson and J. L. Massey, An infinite class of counterexamples to a conjecture concerning nonlinear resilient functions, J. Cryptology, vol.8, pp.67-173, 1995.

J. Y. Tissot and C. Prieur, A randomized orthogonal array-based procedure for the estimation of first-and second-order Sobol' indices, J. Statist. Comput. Simulation, vol.85, pp.1358-1381, 2015.
URL : https://hal.archives-ouvertes.fr/hal-00743964