On the Restricted Liu Estimator in the Logistic Regression Model

Şiray, Gülesen Üstündaĝ; Toker, Selma; Kaçıranlar, Selahattin

doi:10.1080/03610918.2013.771742

Cited by 28 publications

(10 citation statements)

References 8 publications

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“…To make the objective function a smooth function, we fix the sparse code elements in the diagonal matrix as the elements of the previous iteration. Moreover, we note that τ y ′′ is also a function of s i as shown in (8). We also first calculate by using sparse codes solved in the previous iteration, and then fix it when we consider s i in the current iteration.…”

Section: Optimization Of Sparse Codesmentioning

confidence: 99%

A novel multivariate performance optimization method based on sparse coding and hyper-predictor learning

et al. 2015

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In this paper, we investigate the problem of optimization multivariate performance measures, and propose a novel algorithm for it. Different from traditional machine learning methods which optimize simple loss functions to learn prediction function, the problem studied in this paper is how to learn effective hyper-predictor for a tuple of data points, so that a complex loss function corresponding to a multivariate performance measure can be minimized. We propose to present the tuple of data points to a tuple of sparse codes via a dictionary, and then apply a linear function to compare a sparse code against a give candidate class label. To learn the dictionary, sparse codes, and parameter of the linear function, we propose a joint optimization problem. In this problem, the both the reconstruction error and sparsity of sparse code, and the upper bound of the complex loss function are minimized. Moreover, the upper bound of the loss function is approximated by the sparse codes and the linear function parameter. To optimize this problem, we develop an iterative algorithm based on descent gradient methods to learn the sparse codes and hyper-predictor parameter alternately. Experiment results on some benchmark data sets show the advantage of the proposed methods over other state-of-the-art algorithms.

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Section: Optimization Of Sparse Codesmentioning

confidence: 99%

A novel multivariate performance optimization method based on sparse coding and hyper-predictor learning

et al. 2015

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“…(11) Later, following Duffy and Santner (1989), Restricted Logistic Liu estimator (RLLE) by Siray et al, (2015), Restricted Logistic Ridge Estimator (RLRE) by , Restricted Liu-Type Logistic Estimator (RLTLE) by were proposed in the presence of exact linear restrictions in addition to sample model (1). These estimators are defined as (12) (13) (14) When the linear restrictions are stochastic as in (10) in addition to the logistic regression model (1) ( Third type), Nagarajah and Wijekoon (2015) proposed the Stochastic Restricted Maximum Likelihood Estimator (SRMLE).…”

Section: Model Specification and Estimatorsmentioning

confidence: 99%

“…Some of the bised estimators proposed in the literature under the first type are namely the Logistic Ridge Estimator (LRE) ( Schaefer et al, 1984), the Principal Component Logistic Estimator (PCLE) (Aguilera et al,2006), the Modified Logistic Ridge Estimator (MLRE) ( Nja et al, 2013), the Logistic Liu Estimator (LLE) ( Mansson et al, 2012), the Liu-Type Logistic Estimator (LTLE) ( Inan and Erdogan, 2013), the Almost Unbiased Ridge Logistic Estimator (AURLE) , the Almost Unbiased Liu Logistic Estimator (AULLE) (Xinfeng 2015) and the Optimal Generalized Logistic Estimator (OGLE) (Varathan and Wijekoon, 2017). When the exact linear restrictions are available in addition to the sample logistic model (second type), the Restricted Maximum Likelihood Estimator (RMLE) by Duffy and Santner (1989), the Restricted Logistic Liu Estimator (RLLE) by Siray et al (2015), the Modified Restricted Liu Estimator by Wu (2015), the Restricted Logistic Ridge Estimator (RLRE) and the Restricted Liu-Type Logistic Estimator (RLTLE) by have been proposed in the literature. When the restrictions on the parameters are stochastic (third type), Nagarajah and Wijekoon (2015) introduced the new estimator called Stochastic Restricted Maximum Likelihood Estimator (SRMLE), and derived the superiority conditions of SRMLE over the LRE, LLE and RMLE.…”

Section: Introductionmentioning

confidence: 99%

Liu-Type logistic estimator under Stochastic Linear Restrictions

Varathan

Wijekoon

2018

Ceylon J. Sci.

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Abstract:To conquer the multicollinearity problem in logistic regression, many alternative estimators have been proposed in the literature when some linear restrictions on the parameter space are available in addition to the sample model. In this paper, we propose a new two parameter Liu-type estimator called Stochastic Restricted Liu-Type Logistic Estimator (SRLTLE) by combining Liu-type estimator with the logistic model in the presence of stochastic linear restrictions. Further, a Monte Carlo simulation study is done to compare the performance of the proposed estimator with some existing estimators in the scalar mean squared error (SMSE) sense, and a numerical example is given to illustrate the theoretical results.

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“…Following RMLE in (11) and the Mixed Estimator (ME) in (9) in the Linear Regression Model, we propose a new estimator which is named as the Stochastic Restricted Maximum Likelihood Estimator (SRMLE) when the linear stochastic restriction (10) is available in addition to the logistic regression model (1).…”

Section: The Proposed Estimator and Its Asymptotic Propertiesmentioning

confidence: 99%

“…Duffy and Santer (1989) [9] introduce a Restricted Maximum Likelihood Estimator (RMLE) by incorporating the exact linear restriction on the unknown parameters. Recently Şiray et al (2015) [1] proposes a new estimator called Restricted Liu Estimator (RLE) by replacing MLE by RMLE in the logistic Liu estimator.…”

Section: Introductionmentioning

confidence: 99%