A New Class of Distribution-Free Tests for Location Parameters
From MaRDI portal
Publication:4429474
DOI10.1081/SQA-120022086zbMath1026.62043OpenAlexW1976358930MaRDI QIDQ4429474
Omer Ozturk, Narinder Kumar, Radhey S. Singh
Publication date: 25 September 2003
Published in: Sequential Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1081/sqa-120022086
Nonparametric hypothesis testing (62G10) Asymptotic distribution theory in statistics (62E20) Asymptotic properties of nonparametric inference (62G20)
Related Items (9)
A generalized Wilcoxon-Mann-Whitney type test for multivariate data through pairwise distance ⋮ An Adaptive Test for the Two-Sample Location Problem Based onU-Statistics ⋮ A class of k-sample distribution-free tests for location against ordered alternatives ⋮ A new class of distribution-free tests for testing ordered location parameters based on sub-samples ⋮ An adaptive test for the two-sample scale problem where the common quantile may be different from the median ⋮ TESTING OF LOCATION PARAMETER BASED ON SUB-SAMPLE MID-RANGE ⋮ An Adaptive Test for the Two-Sample Scale Problem Based onU-Statistics ⋮ Testing of location parameters against restricted alternatives with optimal choice of weights ⋮ Algorithm-based distribution of two-sample statistics
Cites Work
- Unnamed Item
- Unnamed Item
- Nonparametric tests for homogeneity of scale against ordered alternatives
- A weighted generalization of the Mann-Whitney-Wilcoxon statistic
- Approximation Theorems of Mathematical Statistics
- Two sample nonparametric tests based on subsamples
- Non-parametric tests for several sample location problem based on subsample extrema
- A two-sample test for location
- A generalized quantile estimator
- A class of distribution-free tests for the two-sample slippage problem
- A class of two-sample tests for location based on sub-sample medians
- SUB-SAMPLE MANN–WHITNEY–WILCOXON TEST
- Generalizing the mann-whitney-wilcoxon statistic
- A Generalization of Ahmad's Class of Mann–Whitney–Wilcoxon Statistics
- A generalized wilcoxon-mann-whitney statistic
- A MultiSample NonParametric Scale Test Based on U-Statistics*
- Robust Estimation in Analysis of Variance
- On a Test of Whether one of Two Random Variables is Stochastically Larger than the Other
- Consistency and Unbiasedness of Certain Nonparametric Tests
- A DISTRIBUTION-FREE k-SAMPLE TEST AGAINST ORDERED ALTERNATIVES
This page was built for publication: A New Class of Distribution-Free Tests for Location Parameters
