S. Boucheron, G. Lugosi, and P. Massart, Concentration Inequalities, 2013.
URL : https://hal.archives-ouvertes.fr/hal-00777381

S. Bourguin and G. Peccati, (in preparation) Stochastic Analysis for Poisson Point Processes: Malliavin Calculus, Wiener-Ito Chaos Expansions and Stochastic Geometry Stein and Chen?Stein methods and Malliavin calculus on the Poisson space

P. Calka and N. Chenavier, Extreme values for characteristic radii of a Poisson-Voronoi Tessellation, Extremes, vol.43, issue.1, pp.359-385, 2014.
DOI : 10.1016/0304-4149(88)90092-0

URL : https://hal.archives-ouvertes.fr/hal-00805976

S. Chatterjee, A new method of normal approximation, The Annals of Probability, vol.36, issue.4, pp.1584-1610, 2008.
DOI : 10.1214/07-AOP370

S. Chatterjee, Superconcentration and Related Topics, 2013.
DOI : 10.1007/978-3-319-03886-5

A. Cuevas, R. Fraiman, and A. Rodriguez-casal, A nonparametric approach to the estimation of lengths and surface areas, The Annals of Statistics, vol.35, issue.3, pp.1031-1051, 2007.
DOI : 10.1214/009053606000001532

P. Eichelsbacher and C. Thaele, New Berry-Essen bounds for non-linear functionals of Poisson random measures, Electron. J. Probab, vol.102, 2014.

J. H. Einmahl and E. V. Khmaladze, The Two-Sample Problem in Rm and Measure-Valued Martingales. Lecture Notes-Monograph Series, pp.434-463, 2001.
DOI : 10.1214/lnms/1215090082

URL : http://doi.org/10.1214/lnms/1215090082

H. Federer, Curvature measures, Transactions of the American Mathematical Society, vol.93, issue.3, pp.418-491, 1959.
DOI : 10.1090/S0002-9947-1959-0110078-1

A. Gloria and J. Nolen, A Quantitative Central Limit Theorem for the Effective Conductance on the Discrete Torus, Communications on Pure and Applied Mathematics, vol.222, issue.2, 2015.
DOI : 10.1016/j.jcp.2006.07.034

URL : https://hal.archives-ouvertes.fr/hal-01093352

L. Goldstein and M. Penrose, Normal approximation for coverage models over binomial point processes, The Annals of Applied Probability, vol.20, issue.2, pp.696-721, 2010.
DOI : 10.1214/09-AAP634

URL : http://doi.org/10.1214/09-aap634

R. Gong, C. Houdré, and U. Islak, A Central Limit Theorem for the Optimal Alignments Score in Multiple Random Words, 2015.

M. Heveling and M. Reitzner, Poisson???Voronoi approximation, The Annals of Applied Probability, vol.19, issue.2, pp.719-736, 2009.
DOI : 10.1214/08-AAP561

URL : http://doi.org/10.1214/08-aap561

W. Hoeffding, A Class of Statistics with Asymptotically Normal Distribution, The Annals of Mathematical Statistics, vol.19, issue.3, pp.293-325, 1948.
DOI : 10.1214/aoms/1177730196

C. Houdré and U. Islak, A central limit theorem for the length of the longest common subsequence in random words, 2014.

S. Karlin and Y. Rinott, Applications of Anova Type Decompositions for Comparisons of Conditional Variance Statistics Including Jackknife Estimates, The Annals of Statistics, vol.10, issue.2, pp.485-501, 1982.
DOI : 10.1214/aos/1176345790

W. S. Kendall and I. Molchanov, New Perspectives in Stochastic Geometry, 2010.
DOI : 10.4171/owr/2008/47

L. H. Chen, L. G. Shao, and Q. M. , Normal Approximation by Stein's Method, 2011.

R. Lachì-eze-rey and S. Vega, Boundary density and Voronoi approximation of irregular sets, 2015.

G. Last, G. Peccati, and M. Schulte, Normal approximation on Poisson spaces: Mehler???s formula, second order Poincar?? inequalities and stabilization, Probability Theory and Related Fields, vol.118, issue.3-4, pp.440-455, 2015.
DOI : 10.1007/PL00008749

I. Molchanov, Statistics of the Boolean Model for Practitioners and Mathematicians, 1997.

I. Molchanov, Theory of random sets, 2005.
DOI : 10.1007/978-1-4471-7349-6

J. Nolen, Stochastic Partial Differential Equations: Analysis and Computations Normal approximation for the net flux through a random conductor, pp.1-38, 2015.

G. Peccati, Hoeffding-ANOVA decompositions for symmetric statistics of exchangeable observations, The Annals of Probability, vol.32, issue.3A, pp.1796-1829, 2004.
DOI : 10.1214/009117904000000405

M. Reitzner, Y. Spodarev, and D. Zaporozhets, Set Reconstruction by Voronoi Cells, Advances in Applied Probability, vol.11, issue.04, pp.938-953, 2012.
DOI : 10.1007/PL00008749

URL : http://arxiv.org/abs/1111.4169

W. T. Rhee and M. Talagrand, Martingale inequalities and the Jackknife estimate of variance, Statistics & Probability Letters, vol.4, issue.1, pp.5-6, 1986.
DOI : 10.1016/0167-7152(86)90029-5

A. Rodriguez-casal, Set estimation under convexity type assumptions, Annales de l'Institut Henri Poincare (B) Probability and Statistics, vol.43, issue.6, pp.763-774, 2007.
DOI : 10.1016/j.anihpb.2006.11.001

R. Schneider and W. Weil, Stochastic and Integral Geometry, 2008.
DOI : 10.1007/978-3-540-78859-1

M. Schulte, Normal Approximation of Poisson Functionals in Kolmogorov Distance, Journal of Theoretical Probability, vol.38, issue.1, pp.96-117, 2014.
DOI : 10.1007/s11009-012-9319-2

R. J. Serfling, Approximation Theorems of Mathematical Statistics, 1980.

C. Thaele and J. E. Yukich, Asymptotic theory for statistics of the Poisson???Voronoi approximation, Bernoulli, vol.22, issue.4, pp.2372-2400, 2016.
DOI : 10.3150/15-BEJ732

R. Vitale, Covariances of symmetric statistics, Journal of Multivariate Analysis, vol.41, issue.1, pp.14-26, 1992.
DOI : 10.1016/0047-259X(92)90054-J

URL : https://doi.org/10.1016/0047-259x(92)90054-j

G. Walther, On a generalization of Blaschke's Rolling Theorem and the smoothing of surfaces, Mathematical Methods in the Applied Sciences, vol.14, issue.4, pp.301-316, 1999.
DOI : 10.1017/CBO9780511526282

J. E. Yukich, Surface order scaling in stochastic geometry, The Annals of Applied Probability, vol.25, issue.1, pp.177-210, 2015.
DOI : 10.1214/13-AAP992

URL : http://arxiv.org/pdf/1312.6595