M. Aigner, Combinatorial Order Theory, Grundlehren der mathematischen Wissenschaften, pp.391-451, 1979.

M. Banna, F. Merlevède, and P. Youssef, Bernstein-type inequality for a class of dependent random matrices, Random Matrices: Theory and Applications, vol.05, issue.02, p.1650006, 2016.

H. Berbee, Random walks with stationary increments and renewal theory, Mathematisch Centrum, 1979.

C. A. Biscio and F. Lavancier, Brillinger mixing of determinantal point processes and statistical applications, Electronic Journal of Statistics, vol.10, issue.1, pp.582-607, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01179831

C. A. Biscio and F. Lavancier, Quantifying repulsiveness of determinantal point processes, Bernoulli, vol.22, issue.4, pp.2001-2028, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01003155

D. Bosq, Regression estimation and prediction for discrete time processes, Nonparametric Statistics for Stochastic Processes, pp.65-93, 1996.

R. Bradley, Basic Properties of Strong Mixing Conditions. A Survey and Some Open Questions, Probability Surveys, vol.2, issue.0, pp.107-144, 2005.

J. Coeurjolly and J. Møller, Variational approach for spatial point process intensity estimation, Bernoulli, vol.20, issue.3, pp.1097-1125, 2014.

D. J. Daley and D. Vere-jones, Renewal Processes, Springer Series in Statistics, vol.I, pp.63-108, 1998.

J. Dedecker, P. Doukhan, G. Lang, L. R. José-rafael, S. Louhichi et al., Weak dependence, Weak Dependence: With Examples and Applications, pp.9-20, 2007.
URL : https://hal.archives-ouvertes.fr/hal-00686031

H. Föllmer, A covariance estimate for Gibbs measures, Journal of Functional Analysis, vol.46, issue.3, pp.387-395, 1982.

L. Heinrich, Normal approximation for some mean-value estimates of absolutely regular tessellations, Math. Methods of Statistics, vol.3, pp.1-24, 1994.

L. Heinrich and E. Liebscher, Strong convergence of kernel estimators for product densities of absolutely regular point processes, Journal of Nonparametric Statistics, vol.8, issue.1, pp.65-96, 1997.

L. Heinrich, S. Lück, and V. Schmidt, Asymptotic goodness-of-fit tests for the Palm mark distribution of stationary point processes with correlated marks, Bernoulli, vol.20, issue.4, pp.1673-1697, 2014.

L. Heinrich and I. S. Molchanov, Central limit theorem for a class of random measures associated with germ-grain models, Advances in Applied Probability, vol.31, issue.02, pp.283-314, 1999.

L. Heinrich and Z. Pawlas¹, Absolute regularity and Brillinger-mixing of stationary point processes, Lithuanian Mathematical Journal, vol.53, issue.3, pp.293-310, 2013.

J. Hough, M. Krishnapur, Y. Peres, and B. Virág, Zeros of Gaussian Analytic Functions and Determinantal Point Processes, Zeros of Gaussian Analytic Functions and Determinantal Point Processes, 2009.

J. Jensen, Asymptotic Normality of Estimates in Spatial Point Processes, Scandinavian Journal of Statistics, vol.20, pp.97-109, 1993.

F. Lavancier, J. Møller, and E. Rubak, Determinantal point process models and statistical inference, Journal of the Royal Statistical Society: Series B (Statistical Methodology), vol.77, issue.4, pp.853-877, 2014.
URL : https://hal.archives-ouvertes.fr/hal-01241077

R. Lyons, Awards at the International Congress of Mathematicians at Seoul (Korea) 2014, Notices of the International Congress of Chinese Mathematicians, vol.2, issue.2, pp.52-66, 2014.

O. Macchi, The coincidence approach to stochastic point processes, Advances in Applied Probability, vol.7, issue.1, pp.83-122, 1975.

J. Moller and R. P. Waagepetersen, Statistical Inference and Simulation for Spatial Point Processes, 2003.

J. Møller and R. Waagepetersen, Some Recent Developments in Statistics for Spatial Point Patterns, Annual Review of Statistics and Its Application, vol.4, issue.1, pp.317-342, 2017.

B. Nahapetian, Limit Theorems and Some Applications in Statistical Physics, Limit Theorems and Some Applications in Statistical Physics, Teubner-Texte zur Mathematik, 1991.

A. Poinas, B. Delyon, and F. Lavancier, Mixing properties and central limit theorem for associated point processes, Bernoulli, vol.25, issue.3, pp.1724-1754, 2019.
URL : https://hal.archives-ouvertes.fr/hal-01519096

M. Proke?ová and E. B. Jensen, Asymptotic Palm likelihood theory for stationary point processes, Annals of the Institute of Statistical Mathematics, vol.65, issue.2, pp.387-412, 2012.

E. Rio, Mixing and Coupling, Asymptotic Theory of Weakly Dependent Random Processes, pp.89-100, 2017.

M. Rosenblatt, A CENTRAL LIMIT THEOREM AND A STRONG MIXING CONDITION, Proceedings of the National Academy of Sciences, vol.42, issue.1, pp.43-47, 1956.

Y. Rozanov and V. Volkonskii, Some limit theorems for random functions I, Theory Probab. Appl, vol.4, pp.178-197, 1959.

G. Viennet, Inequalities for absolutely regular sequences: application to density estimation, Probability Theory and Related Fields, vol.107, issue.4, p.467, 1997.

R. Waagepetersen and Y. Guan, Two-step estimation for inhomogeneous spatial point processes, Journal of the Royal Statistical Society: Series B (Statistical Methodology), vol.71, issue.3, pp.685-702, 2009.