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On the asymptotic properties of a simple estimate of the Mode

Published online by Cambridge University Press:  15 September 2004

Christophe Abraham
Affiliation:
ENSAM-INRA, UMR Biométrie et Analyse des Systèmes, 2 place Pierre Viala, 34060 Montpellier Cedex 1, France; [email protected].
Gérard Biau
Affiliation:
Laboratoire de Statistique Théorique et Appliquée, Université Pierre et Marie Curie – Paris VI, Boîte 158, 175 rue du Chevaleret, 75013 Paris, France; [email protected].
Benoît Cadre
Affiliation:
Laboratoire de Probabilités et Statistique, Université Montpellier II, Cc. 051, place Eugène Bataillon, 34095 Montpellier Cedex 5, France; [email protected].
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Abstract

We consider an estimate of the mode θ of a multivariate probability density f with support in $\mathbb R^d$ using a kernel estimate f n drawn from a sample X1,...,Xn . The estimate θn is defined as any x in {X1,...,Xn } such that $f_n(x)=\max_{i=1, \hdots,n} f_n(X_i)$ . It is shown that θn behaves asymptotically as any maximizer ${\hat{\theta}}_n$ of f n . More precisely, we prove that for any sequence $(r_n)_{n\geq 1}$ of positive real numbers such that $r_n\to\infty$ and $r_n^d\log n/n\to 0$ , one has $r_n\,\|\theta_n-{\hat{\theta}}_n\| \to 0$ in probability. The asymptotic normality of θn follows without further work.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2004

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References

Abraham, C., Biau, G. and Cadre, B., Simple estimation of the mode of a multivariate density. Canadian J. Statist. 31 (2003) 23-34. CrossRef
Devroye, L., Recursive estimation of the mode of a multivariate density. Canadian J. Statist. 7 (1979) 159-167. CrossRef
L. Devroye, A Course in Density Estimation. Birkhäuser, Boston (1987).
Eddy, W.F., Optimum kernel estimates of the mode. Ann. Statist. 8 (1980) 870-882. CrossRef
Konakov, V.D., On asymptotic normality of the sample mode of multivariate distributions. Theory Probab. Appl. 18 (1973) 836-842.
Leclerc, J. and Pierre-Loti-Viaud, D., Vitesse de convergence presque sûre de l'estimateur à noyau du mode. C. R. Acad. Sci. Paris 331 (2000) 637-640. CrossRef
A. Mokkadem and M. Pelletier, A law of the iterated logarithm for the kernel mode estimator, ESAIM: Probab. Statist. 7 (2003) 1-21.
Parzen, E., On estimation of a probability density function and mode. Ann. Math. Statist. 33 (1962) 1065-1076. CrossRef
D. Pollard, Convergence of Stochastic Processes. Springer–Verlag, New York (1984).
Romano, J.P., On weak convergence and optimality of kernel density estimates of the mode. Ann. Statist. 16 (1988) 629-647. CrossRef
Rosenblatt, M., Remarks on some nonparametric estimates of a density function. Ann. Math. Statist. 27 (1956) 832-837. CrossRef
Sager, T.W., Estimating modes and isopleths. Comm. Statist. – Theory Methods 12 (1983) 529-557. CrossRef
Samanta, M., Nonparametric estimation of the mode of a multivariate density. South African Statist. J. 7 (1973) 109-117.
Silverman, B., Weak and strong uniform consistency of the kernel estimate of a density and its derivatives. Ann. Statist. 6 (1978) 177-184. CrossRef
Vieu, P., A note on density mode estimation. Statist. Probab. Lett. 26 (1996) 297-307. CrossRef