Edgeworth approximations for distributions of symmetric statistics
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Publication:2159260
DOI10.1007/s00440-022-01144-xOpenAlexW3128189496WikidataQ114229357 ScholiaQ114229357MaRDI QIDQ2159260
Friedrich Götze, Mindaugas Bloznelis
Publication date: 28 July 2022
Published in: Probability Theory and Related Fields (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2102.03589
Edgeworth expansion\(U\)-statisticHoeffding decompositionLittlewood-Offord problemsymmetric statisticconcentration in Banach spaces
Cites Work
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- Edgeworth expansion for Student's t statistic under minimal moment conditions
- Asymptotic expansions for general statistical models. With the assist. of W. Wefelmeyer
- An Edgeworth expansion for U-statistics
- Correction to: On the validity of the formal Edgeworth expansion
- The jackknife estimate of variance
- Edgeworth expansions and smoothness
- Edgeworth expansion of a function of sample means
- Exponential inequalities for sums of random vectors
- On the validity of the formal Edgeworth expansion
- An Edgeworth expansion for symmetric statistics
- Optimal bounds in non-Gaussian limit theorems for \(U\)-statistics
- The Edgeworth expansion for U-statistics of degree two
- Edgeworth expansions in nonparametric statistics
- Lattice point problems and values of quadratic forms
- Lattice point problems and distribution of values of quadratic forms
- Willem van Zwet's research
- A weak Cramér condition and application to Edgeworth expansions
- Khinchine's theorem and Edgeworth approximations for weighted sums
- Explicit rates of approximation in the CLT for quadratic forms
- Fourier analysis of distribution functions. A mathematical study of the Laplace-Gaussian law
- A Berry-Esseen bound for symmetric statistics
- Normal Approximation and Asymptotic Expansions
- Approximation Theorems of Mathematical Statistics
- Asymptotic expansions for bivariate von Mises functionals
- An Expansion for a Discrete Non-Lattice Distribution
- Splitting a Single State of a Stationary Process into Markovian States
- Deficiency
- A Class of Statistics with Asymptotically Normal Distribution
- The Approximate Distribution of Student's Statistic
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