The Relation Between Pitman's Asymptotic Relative Efficiency of Two Tests and the Correlation Coefficient Between Their Test Statistics
From MaRDI portal
Publication:5336786
DOI10.1214/aoms/1177703876zbMath0128.38505OpenAlexW2060125983MaRDI QIDQ5336786
Publication date: 1963
Published in: The Annals of Mathematical Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1214/aoms/1177703876
Related Items (21)
Testing spatial symmetry using contingency tables based on nearest neighbor relations ⋮ Bayesian efficiency ⋮ A Note on Signed Rank Tests for the Changepoint Problem ⋮ Comparison of relative density of two random geometric digraph families in testing spatial clustering ⋮ Simple exact bounds for distributions of linear signed rank statistics ⋮ Relative density of the random \(R\)-factor proximity catch digraph for testing spatial patterns of segregation and association ⋮ Efficiency Robust Tests for Survival or Ordered Categorical Data ⋮ Spatial Clustering Tests Based on the Domination Number of a New Random Digraph Family ⋮ On the Hodges-Lehmann approximate efficiency ⋮ A robust distribution-free test for genetic association studies of quantitative traits ⋮ Locally most powerful rank tests of independence for copula models ⋮ Score tests for independence in semiparametric competing risks models ⋮ A rule of thumb for testing symmetry about an unknown median against a long right tail ⋮ Correlation coefficients between nonparametric tests for location and scale ⋮ On a further generalization of the savage test ⋮ Asymptotic relative efficiencies of r-estimators of location ⋮ Application of the finite efficacy ratio for one-sample location ⋮ A new family of random graphs for testing spatial segregation ⋮ A note on testing symmetry with estimated parameters ⋮ A monte carlo comparison of somet-tests ⋮ Asymptotic efficiency of independence tests based on gini's rank association coefficient, spearman's footrule and their generalizations
This page was built for publication: The Relation Between Pitman's Asymptotic Relative Efficiency of Two Tests and the Correlation Coefficient Between Their Test Statistics
