Bayesian estimation of bandwidth in semiparametric kernel estimation of unknown probability mass and regression functions of count data

Kiessé, Tristan Senga; Zougab, Nabil; Kokonendji, Célestin C.

doi:10.1007/s00180-015-0627-1

Cited by 12 publications

(11 citation statements)

References 24 publications

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“…However, in this paper and following Senga Kiessé et al (2015) and, Zougab et al (2014) we choose α = 0.5 and β = √ n. The choice of β which depends on the sample size n is important for the consistency of nonparametric kernel estimator of pmf and permits the convergence of Bayesian bandwidths estimators to zero (h j → 0 while n → ∞ for j = 1, . .…”

Section: Q(h (T)mentioning

confidence: 98%

“…Therefore, recently the so-called discrete associated kernel method is largely developed by several authors; see, e.g., Kokonendji and Senga Kiessé (2011), Kokonendji, Senga Kiessé, and Balakrishnan (2009), Kokonendji et al (2007), Wansouwé, Kokonendji, and Kolyang (2015), Zougab, Adjabi, and Kokonendji (2012) and Zougab, Adjabi, and Kokonendji (2013a). Note that the semi-parametric estimation of pmf and count rf (crf) is also investigated, see for example Abdous, Kokonendji, and Senga Kiessé (2012) and Senga Kiessé, Zougab, and Kokonendji (2015). They showed that the use of a discrete associated kernel is more appropriate than the use of a continuous kernel for both estimations of pmf and crf of a discrete variable.…”

Section: Introductionmentioning

confidence: 98%

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Bayesian bandwidth selection in discrete multivariate associated kernel estimators for probability mass functions

Belaid

Adjabi

Zougab

et al. 2016

Journal of the Korean Statistical Society

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a b s t r a c tThis paper proposed a nonparametric estimator for probability mass function of multivariate data. The estimator is based on discrete multivariate associated kernel without correlation structure. For the choice of the bandwidth diagonal matrix, we presented the Bayes global method against the likelihood cross-validation one, and we used the Bayesian Markov chain Monte Carlo (MCMC) method for deriving the global optimal bandwidth. We have compared the proposed method with the cross-validation method. The performance of both methods is evaluated under the integrated square error criterion through simulation studies based on for univariate and multivariate models. We also presented applications of the proposed methods to bivariate and trivariate real data. The obtained results show that the Bayes global method performs better than cross-validation one, even for the Poisson kernel which is the very bad discrete associated kernel among binomial, discrete triangular and Dirac discrete uniform kernels.

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Section: Q(h (T)mentioning

confidence: 98%

Section: Introductionmentioning

confidence: 98%

Bayesian bandwidth selection in discrete multivariate associated kernel estimators for probability mass functions

Belaid

Adjabi

Zougab

et al. 2016

Journal of the Korean Statistical Society

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“…However, the naive estimator is appropriate only when the sample size is large, and the discrete kernel of Aitchison and Aitken (1976) is only suitable for categorical data; see Hayfield and Racine (2008) and also Hayfield and Racine (2014). Kokonendji et al (2009) adapted the Nadaraya (1964) and Watson (1964) kernel to the discrete unknown function m, using the discrete associated kernels. In their work, using the integrated mean square error and the coefficient of determination R 2 , they showed that the binomial or discrete triangular kernels are better compared to the optimal Epanechnikov kernel.…”

Section: Bandwidth Selection For Kernel Regression Involving Associatmentioning

confidence: 99%

“…where m −i (X i ) is computed as m n of (24) excluding X i ; see, e.g., Kokonendji et al (2009). The hcvreg.fun function to compute this optimal bandwidth is described in Table 3.…”

Section: Cross-validation For Any Associated Kernelmentioning

confidence: 99%

Ake: An R Package for Discrete and Continuous Associated Kernel Estimations

Wansouwé¹,

Somé²,

Kokonendji³

2016

The R Journal

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Kernel estimation is an important technique in exploratory data analysis. Its utility relies on its ease of interpretation, especially based on graphical means. The Ake package is introduced for univariate density or probability mass function estimation and also for continuous and discrete regression functions using associated kernel estimators. These associated kernels have been proposed due to their specific features of variables of interest. The package focuses on associated kernel methods appropriate for continuous (bounded, positive) or discrete (count, categorical) data often found in applied settings. Furthermore, optimal bandwidths are selected by cross-validation for any associated kernel and by Bayesian methods for the binomial kernel. Other Bayesian methods for selecting bandwidths with other associated kernels will complete this package in its future versions; particularly, a Bayesian adaptive method for gamma kernel estimation of density functions is developed. Some practical and theoretical aspects of the normalizing constant in both density and probability mass functions estimations are given.

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“…f of 1 i.i.d. observations (X i ) i=1,••• ,n was constructed to behave asymptotically as the frequency estimator F(x) = n −1 n i=1 1 {x} (X i ), x ∈ S, where 1 A denotes the indicator function of the set A (for details about f , see later equation (6) in Section 3).…”

Section: Introductionmentioning

confidence: 99%

On finite sample properties of nonparametric discrete asymmetric kernel estimators

Kiessé

2017

Statistics

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The discrete kernel method was developed to estimate count data distributions, distinguishing discrete associated kernels based on their asymptotic behaviour. This study investigates the class of discrete asymmetric kernels and their resulting non-consistent estimators, but this theoretical drawback of the estimators is balanced by some interesting features in small/medium samples. The role of modal probability and variance of discrete asymmetric kernels is highlighted to help better understand the performance of these kernels, in particular how the binomial kernel outperforms other asymmetric kernels. The performance of discrete asymmetric kernel estimators of probability mass functions is illustrated using simulations, in addition to applications to real data sets.

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Bayesian estimation of bandwidth in semiparametric kernel estimation of unknown probability mass and regression functions of count data

Cited by 12 publications

References 24 publications

Bayesian bandwidth selection in discrete multivariate associated kernel estimators for probability mass functions

Bayesian bandwidth selection in discrete multivariate associated kernel estimators for probability mass functions

Ake: An R Package for Discrete and Continuous Associated Kernel Estimations

On finite sample properties of nonparametric discrete asymmetric kernel estimators

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