On deviations between empirical and quantile processes for mixing random variables

MODERATE DEVIATION PRINCIPLE OF SAMPLE QUANTILES AND ORDER STATISTICS, Asymptotics of \(k\)-mean clustering under non-i.i.d. sampling, The Bahadur representation of sample quantiles for sequences of strongly mixing random variables, A trimmed mean of location of an AR\((\infty)\) stationary process, On the Bahadur representation of sample quantiles for ψ-mixing sequences and its application, Berry-Esséen bound of sample quantiles for negatively associated sequence, Strong representations for LAD estimators in linear models, Marcinkiewicz–Zygmund and ordinary strong laws for empirical distribution functions and plug-in estimators, Limit theorems for functionals of moving averages, Asymptotics for the linear kernel quantile estimator, The Bahadur representation for sample quantiles under strongly mixing sequence, A note on strong approximation for quantile processes of strong mixing sequences, A remark on the Bahadur representation of sample quantiles for negatively associated sequences, Large deviation probabilities for certain dependent processes, Normal limits, nonnormal limits, and the bootstrap for quantiles of dependent data, Estimation of the reciprocal of the density quantile function at a point, On quantile processes for m-dependent Rv's, Kesar Singh's contributions to statistical methodology, The Berry-Esséen type bound of sample quantiles for strong mixing sequence, On r-quick limit sets for empirical and related processes based on mixing random variables, Bahadur-Kiefer theory for sample quantiles of weakly dependent linear processes, The Bahadur representation for sample quantiles under negatively associated sequence, The Bahadur representation for sample quantile under NOD sequence, Some Asymptotic Properties Between Smooth Empirical and Quantile Processes for Dependent Random Variables, Moderate deviations for M-estimators in linear models with \(\phi\)-mixing errors, Bahadur representation of linear kernel quantile estimator of VaR under \(\alpha \)-mixing assumptions, Bahadur representation for \(U\)-quantiles of dependent data, Smooth estimation of a distribution and density function on a hypercube using Bernstein polynomials for dependent random vectors, The Bahadur representation for sample quantiles under weak dependence, The Bahadur representation for sample quantiles under dependent sequence, A note on bootstrapping the variance of sample quantile, \(M\)-estimation of linear models with dependent errors, The Bahadur representation of sample quantiles for weakly dependent sequences, Asymptotic properties of Bernstein estimators on the simplex, On Bahadur representation for sample quantiles under \(\alpha\)-mixing sequence, On the Glivenko-Cantelli theorem for generalized empirical processes based on strong mixing sequences, Rank order statistics for time series models, \(U\)-processes, \(U\)-quantile processes and generalized linear statistics of dependent data, A note on the Bahadur representation of sample quantiles for \(\alpha \)-mixing random variables, The Bahadur representation of sample quantiles for φ-mixing random variables and its application, Deviations between sample quantiles and empirical processes under absolute regular properties, Set-indexed conditional empirical and quantile processes based on dependent data, On the accuracy of bootstrapping sample quantiles of strongly mixing sequences, Estimating Bayesian credible intervals, Multivariate generalized linear-statistics of short range dependent data, Application of Bernstein polynomials for smooth estimation of a distribution and density function

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• A note on empirical processes of strong-mixing sequences
• The Law of the Iterated Logarithm for Some Classes of Stationary Processes
• On Bahadur's Representation of Sample Quantiles
• The Invariance Principle for Stationary Processes
• A Note on Weak Convergence of Empirical Processes for Sequences of $\phi$- Mixing Random Variables
• Some Limit Theorems for Stationary Processes