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References
R. Adamczak, W. Bednorz, P. Wolff, Moment estimates implied by modified log-Sobolev inequalities. ESAIM Probab. Stat. 21, 467–494 (2017)
S. Aida, D. Stroock, Moment estimates derived from Poincaré and logarithmic Sobolev inequalities. Math. Res. Lett. 1, 75–86 (1994)
R.G. Bartle, The Elements of Integration and Lebesgue Measure (Wiley, New York, 1995)
P. Bickel, Y. Ritov, Estimating integrated square density derivatives: sharp best order of convergence estimates. Sankhya 50, 381–393 (1988)
L. Birgé, P. Massart, Estimation of integral functionals of a density. Ann. Statist. 23, 11–29 (1995)
S. Bobkov, C. Houdré, Isoperimetric constants for product probability measures. Ann. Probab. 25(1), 184–205 (1997)
S. Brazitikos, A. Giannopoulos, P. Valettas, B.-H. Vritsiou, Geometry of Isotropic Convex Bodies (American Mathematical Society, Providence, 2014)
Y. Chen, An almost constant lower bound of the isoperimetric coefficient in the KLS conjecture. Geom. Funct. Anal. 31, 34–61 (2021)
P. Hall, The Bootstrap and Edgeworth Expansion (Springer, New York, 1992)
P. Hall, M.A. Martin, On Bootstrap Resampling and Iteration. Biometrika 75(4), 661–671 (1988)
I.A. Ibragimov, R.Z. Khasminskii, Statistical Estimation: Asymptotic Theory (Springer, New York, 1981)
I.A. Ibragimov, A.S. Nemirovski, R.Z. Khasminskii, Some problems of nonparametric estimation in Gaussian white noise. Theory Probab. Appl. 31, 391–406 (1987)
J. Jiao, Y. Han, T. Weissman, Bias correction with Jackknife, Bootstrap and Taylor series. IEEE Trans. Inf. Theory 66(7), 4392–4418 (2020)
V. Koltchinskii, Asymptotically efficient estimation of smooth functionals of covariance operators. J. Euro. Math. Soc. 23(3), 765–843 (2021)
V. Koltchinskii, Asymptotic efficiency in high-dimensional covariance estimation. Proceedings of the International Congress of Mathematicians: Rio de Janeiro 2018, vol. 3 (2018), pp. 2891–2912
V. Koltchinskii, Estimation of smooth functionals in high-dimensional models: bootstrap chains and Gaussian approximation. Ann. Statist. 50, 2386–2415 (2022). arXiv:2011.03789
V. Koltchinskii, M. Zhilova, Efficient estimation of smooth functionals in Gaussian shift models. Ann. Inst. Henri Poincaré Probab. Stat. 57(1), 351–386 (2021)
V. Koltchinskii, M. Zhilova, Estimation of smooth functionals in normal models: bias reduction and asymptotic efficiency. Ann. Statist. 49(5), 2577–2610 (2021)
V. Koltchinskii, M. Zhilova, Estimation of smooth functionals of location parameter in Gaussian and Poincaré random shift models. Sankhya 83, 569–596 (2021)
M. Ledoux, The Concentration of Measure Phenomenon (American Mathematical Society, Providence, 2001)
B. Levit, On the efficiency of a class of non-parametric estimates. Theory Prob. Appl. 20(4), 723–740 (1975)
B. Levit, Asymptotically efficient estimation of nonlinear functionals. Probl. Peredachi Inf. (Probl. Info. Trans.) 14(3), 65–72 (1978)
Y. Miao, Concentration inequality of maximum likelihood estimator. Appl. Math. Lett. 23(10), 1305–1309 (2010)
E. Milman, On the role of convexity in isoperimetry, spectral gap and concentration. Invent. Math. 177(1), 1–43 (2009)
A. Nemirovski, On necessary conditions for the efficient estimation of functionals of a nonparametric signal which is observed in white noise. Theory Probab. Appl. 35, 94–103 (1990)
A. Nemirovski, Topics in Non-parametric Statistics. Ecole d’Ete de Probabilités de Saint-Flour. Lecture Notes in Mathematics, vol. 1738 (Springer, New York, 2000)
E. Rio, Upper bounds for minimal distances in the central limit theorem. Ann. Inst. Henri Poincaré Probab. Stat. 45(3), 802–817 (2009)
A.B. Tsybakov, Introduction to Nonparametric Estimation (Springer, New York, 2009)
R. Vershynin, High-Dimensional Probability: An Introduction with Applications in Data Science. (Cambridge University Press, Cambridge, 2018)
M. Wahl, Lower bounds for invariant statistical models with applications to principal component analysis. Ann. Inst. Henri Poincaré Probab. Stat. 58(3), 1565–1589 (2022)
Acknowledgements
Vladimir Koltchinskii was supported in part by NSF grants DMS-1810958 and DMS-2113121. Martin Wahl was supported by the Alexander von Humboldt Foundation.
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Koltchinskii, V., Wahl, M. (2023). Functional Estimation in Log-Concave Location Families. In: Adamczak, R., Gozlan, N., Lounici, K., Madiman, M. (eds) High Dimensional Probability IX. Progress in Probability, vol 80. Birkhäuser, Cham. https://doi.org/10.1007/978-3-031-26979-0_15
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