Statistical properties of $b$-adic diaphonies
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Publication:2953208
DOI10.1090/mcom/3148zbMath1355.65023OpenAlexW2560070002MaRDI QIDQ2953208
Publication date: 4 January 2017
Published in: Mathematics of Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/mcom/3148
equidistributionnumerical resultapproximation of distributions\(b\)-adic diaphonyquasi-Monte Carlo sequencesquadratic forms in Gaussian random variables
Asymptotic distribution theory in statistics (62E20) Monte Carlo methods (65C05) Approximations to statistical distributions (nonasymptotic) (62E17)
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- Sequences, discrepancies and applications
- Dyadic diaphony of digital sequences
- Normal approximation - some recent advances
- Invariant tests for uniformity on compact Riemannian manifolds based on Sobolev norms
- Large sample theory for U-statistics and tests of fit
- Complete convergence of triangular arrays and the law of the iterated logarithm for U-statistics
- Optimal bounds in non-Gaussian limit theorems for \(U\)-statistics
- Asymptotic expansions of the Hurwitz--Lerch zeta function
- The weighted \(b\)-adic diaphony
- Dyadic diaphony of digital nets over \(\mathbb Z_2\)
- Diaphony, discrepancy, spectral test and worst-case error
- Fourier analysis of distribution functions. A mathematical study of the Laplace-Gaussian law
- Asymptotic properties of the spectral test, diaphony, and related quantities
- The b-adic Diaphony as a Tool to Study Pseudo-randomness of Nets
- Dyadic diaphony
- The Weighted Dyadic Diaphony of Digital Sequences
- Algorithm AS 155: The Distribution of a Linear Combination of χ 2 Random Variables
- Distribution of Quadratic Forms in Normal Random Variables—Evaluation by Numerical Integration
- The Fisher, Neyman-Pearson Theories of Testing Hypotheses: One Theory or Two?
- Probability for Statisticians
- Asymptotic Statistics
- Computational aspects of Cui-Freeden statistics for equidistribution on the sphere
- Statistical properties of generalized discrepancies
- Computing the distribution of quadratic forms in normal variables
- Numerical inversion of a characteristic function
- Uniform distribution, discrepancy, and reproducing kernel Hilbert spaces
