Chi-Squared Goodness-of-Fit Tests: Cell Selection and Power
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Publication:4019129
DOI10.1080/03610919008812915zbMath0850.62382OpenAlexW2090910286MaRDI QIDQ4019129
Kenneth J. Koehler, Fah-Fatt Gan
Publication date: 16 January 1993
Published in: Communications in Statistics - Simulation and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610919008812915
Related Items (8)
A Bayesian \(\chi^2\) test for goodness-of-fit ⋮ A consistent bayesian bootstrap for chi-squared goodness-of-fit test using a dirichlet prior ⋮ The autodependogram: a graphical device to investigate serial dependences ⋮ A chi-square goodness-of-fit test for continuous distributions against a known alternative ⋮ Assessing fit in Bayesian models for spatial processes ⋮ The choice of the number of bins for the \(M\) statistic ⋮ A Bayesian Chi-Squared Goodness-of-Fit Test for Censored Data Models ⋮ The Sensitivity of Chi-Squared Goodness-of-Fit Tests to the Partitioning of Data
Cites Work
- Efficiencies of chi-square and likelihood ratio goodness-of-fit tests
- Asymptotic results for goodness-of-fit statistics with unknown parameters
- THE CHOICE OF CELLS IN CHI–SQUARE TESTS
- Separable Statistics and Hypothesis Testing. The Case of Small Samples
- Are Two Classes Enough for the X2Goodness of Fit Test?
- Tests for departure from normality: Comparison of powers
- The $\chi^2$ Test of Goodness of Fit
- On the Choice of the Number of Class Intervals in the Application of the Chi Square Test
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