Estimation of the common location paeameters for the two linear models

Various estimators proposed for the estimation of a common mean are extended to the estimation of the common location parameters for two linear models including the estimators based on preliminary tests of equality of variances. Exact distribution of these estimates, simultaneous confidence bounds based on these estimates and the bounds on the variances of these estimates are obtained using different approaches.     

ON TESTING THE EQUALITY OF LOCATION PARAMETERS IN k CENSORED EXPONENTIAL DISTRIBUTIONS

Kumar and Patel (1971) have considered the problem of testing the equality of location parameters of two exponential distributions on the basis of samples censored from above, when the scale parameters are the same and unknown. The test proposed by them is shown to be biased for n₁≠n₂, while for n₁=n₂ the test possesses the property of monotonicity and is equivalent to the likelihood ratio test, which is considered by Epstein and Tsao (1953) and Dubey (1963a, 1963b). Epstein and Tsao state that the test is unbiased. We may note that when the scale parameters of k exponential distributions are unknown the problem of testing the equality of location parameters is reducible to that of testing the equality of parameters in k rectangular populations for which a test and its power function were given by Khatri (1960, 1965); Jaiswal (1969) considered similar problems in his thesis. Here we extend the problem of testing the equality of k exponential distributions on the basis of samples censored from above when the scale parameters are equal and unknown, and we establish the likelihood ratio test (LET) and the union-intersection test (UIT) procedures. Using the results previously derived by Jaiswal (1969), we obtain the power function for the LET and for k= 2 show that the test possesses the property of monotonicity. The power function of the UIT is also given.     

Unified treatment of Cramér-Rao bound for the nonregular density functions

This paper extends the idea of Vincze (1978) and unifies the approach for the uniparameter and multiparameter situations for obtaining the Cramér-Rao inequality.