On estimation of parameters in the case of discontinuous densities Full article
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Theory of Probability and its Applications
ISSN: 0040-585X , E-ISSN: 1095-7219 |
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| Output data | Year: 2018, Volume: 63, Number: 2, Pages: 169-192 Pages count : 24 DOI: 10.1137/S0040585X97T98899X | ||||
| Tags | Change-point problem; Distribution with discontinuous density; Estimators of parameters; Infinitely divisible factorization; Maximum likelihood estimator | ||||
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Abstract:
This paper is concerned with the problem of construction of estimators of parameters in the case when the density fθ (x) of the distribution Pθ of a sample X of size n has at least one point of discontinuity x(θ), x′(θ) ≠ 0. It is assumed that either (a) from a priori considerations one can specify a localization of the parameter θ (or points of discontinuity) satisfying easily verifiable conditions, or (b) there exists a consistent estimator (formula presented) of the parameter θ (possibly constructed from the same sample X), which also provides some localization. Then a simple rule is used to construct, from the segment of the empirical distribution function defined by the localization, a family of estimators θg ∗ that depends on the parameter g such that (1) for sufficiently large n, the probabilities P(θg ∗ − θ > v/n)and P(θ∗ g − θ < −v/n) can be explicitly estimated by a v-exponential bound; (2) in case (b) under suitable conditions (see conditions I–IV in Chap. 5 of [I. A. Ibragimov and R. Z. Has’minskiĭ, Statistical Estimation. Asymptotic Theory, Springer, New York, 1981], where maximum likelihood estimators were studied), a value of g can be given such that the estimator θg ∗ is asymptotically equivalent to the maximum likelihood estimator (formula presented) for any v and n → ∞; (3) the value of g can be chosen so that the inequality (formula presented) is possible for sufficiently large n. Effectively no smoothness conditions are imposed on fθ (x). With an available “auxiliary” consistent estimator (formula presented), simple rules are suggested for finding estimators θg ∗ which are asymptotically equivalent to(formula presented). The limiting distribution of n(θg ∗ −θ) as n → ∞ is studied. © 2018 Society for Industrial and Applied Mathematics.
Cite:
Borovkov A.A.
On estimation of parameters in the case of discontinuous densities
Theory of Probability and its Applications. 2018. V.63. N2. P.169-192. DOI: 10.1137/S0040585X97T98899X WOS Scopus OpenAlex
On estimation of parameters in the case of discontinuous densities
Theory of Probability and its Applications. 2018. V.63. N2. P.169-192. DOI: 10.1137/S0040585X97T98899X WOS Scopus OpenAlex
Original:
Боровков А.А.
Об оценивании параметров в случае разрывных плотностей
Теория вероятностей и ее применения. 2018. Т.63. №2. С.211–239. DOI: 10.4213/tvp5141 РИНЦ OpenAlex
Об оценивании параметров в случае разрывных плотностей
Теория вероятностей и ее применения. 2018. Т.63. №2. С.211–239. DOI: 10.4213/tvp5141 РИНЦ OpenAlex
Identifiers:
| Web of science: | WOS:000448195800001 |
| Scopus: | 2-s2.0-85056951809 |
| OpenAlex: | W2898599846 |