左截断、右截和相关假设下分位数差异的局部似然

IF 1.2 4区 数学 Q2 STATISTICS & PROBABILITY
Cui-Juan Kong, Han-Ying Liang, Guoliang Fan
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引用次数: 0

摘要

本文主要研究左截右删模型的条件分位数差(CQD)推理。基于观测数据的局部条件似然函数,构造了CQD的局部似然比函数和光滑局部对数似然比(log-SLL),并由对数似然比进一步定义了CQD的最大局部似然估计量。当观测值被假设为平稳α-混合随机变量序列时,我们建立了所定义的估计量的渐近正态性,并证明了调整后的log-SLL的Wilks定理。此外,我们在条件分布函数的积极限估计的基础上定义了CQD的另一个估计量,并给出了它的渐近正态性。此外,还进行了仿真研究和实际数据分析,以研究所提出方法的有限样本行为。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Local likelihood of quantile difference under left-truncated, right-censored and dependent assumptions
We, in this paper, focus on the inference of conditional quantile difference (CQD) for left-truncated and right-censored model. Based on local conditional likelihood function of the observed data, local likelihood ratio function and smoothed local log-likelihood ratio (log-SLL) of the CQD are constructed, and the maximum local likelihood estimator of the CQD is further defined from the log-SLL. When the observations are assumed to be a sequence of stationary α-mixing random variables, we establish asymptotic normality of the defined estimator, and prove the Wilks' theorem of adjusted log-SLL. Besides, we define another estimator of the CQD based on product-limit estimator of conditional distribution function and give its asymptotic normality. Also, simulation study and real data analysis are conducted to investigate the finite sample behaviour of the proposed methods.
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来源期刊
Statistics
Statistics 数学-统计学与概率论
CiteScore
1.00
自引率
0.00%
发文量
59
审稿时长
12 months
期刊介绍: Statistics publishes papers developing and analysing new methods for any active field of statistics, motivated by real-life problems. Papers submitted for consideration should provide interesting and novel contributions to statistical theory and its applications with rigorous mathematical results and proofs. Moreover, numerical simulations and application to real data sets can improve the quality of papers, and should be included where appropriate. Statistics does not publish papers which represent mere application of existing procedures to case studies, and papers are required to contain methodological or theoretical innovation. Topics of interest include, for example, nonparametric statistics, time series, analysis of topological or functional data. Furthermore the journal also welcomes submissions in the field of theoretical econometrics and its links to mathematical statistics.
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