\(L_ p\)-approximations of weighted partial sum processes

A glimpse of the impact of pál erdős on probability and statistics, On weighted approximations in \(D[0,1\) with applications to self-normalized partial sum processes]

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• A Non-Parametric Approach to the Change-Point Problem
• Invariance principles for stochastic area and related stochastic integrals
• Sequential analysis. Tests and confidence intervals
• Weighted empirical and quantile processes
• Invariance principles for changepoint problems
• Approximations of weighted empirical and quantile processes
• On the invariance principle for U-statistics
• Changepoint problems and contiguous alternatives
• On the weak convergence of empirical processes in sup-norm metrics
• An improvement of Strassen's invariance principle
• The Darling-Erdős theorem for sums of i.i.d. random variables
• Nonparametric statistical procedures for the changepoint problem
• Convergence of integrals of uniform empirical and quantile processes
• Approximation Theorems of Mathematical Statistics
• Asymptotic distributions of pontograms
• A simple cumulative sum type statistic for the change-point problem with zero-one observations
• Alignments in two-dimensional random sets of points
• Asymptotic distributions of weighted pontograms under contiguous alternatives
• An approximation of partial sums of independent RV's, and the sample DF. II
• An approximation of partial sums of independent RV'-s, and the sample DF. I
• The approximation of partial sums of independent RV's
• Asymptotic distributions of weighted compound Poisson bridges
• Inference about the change-point in a sequence of random variables