Publications by James V. Zidek FRSC, O.C.
1976
A necessary condition for the admissibility under convex loss of equivariant estimators. Stanford, California: Department of Statistics, Stanford University; 1976. .
1975
Simultaneous estimation of the means of independent Poisson laws. Journal of the American Statistical Association. Taylor and Francis; 1975; 70: 698–705. .
Bridge traffic loads - are we overdesigning: Lion's Gate Bridge Study. Buckland and Taylor Ltd; 1975. .
1974
1973
Estimating the scale parameter of the exponential distribution with unknown location. Ann Statist. 1973;: 264–278. .
Marginalization paradoxes in Bayesian and structural inference. Journal of the Royal Statistical Society. Series B (Methodological). 1973;: 189–233. .
1971
Inadmissibility of a class of estimators of a normal quantile. Ann Math Statist. 1971;: 1444–1447. .
1970
Estimating scale parameter of exponential distribution with unknown scale with unknown location. Ann. Math. Statist. Inst Mathematical Statistics, IMS Business Office - suite 7, 3401 INVESTMENT BLVD, HAYWARD, CA 94545; 1970; 41: 1807. .
Sufficient conditions for the admissibility under squared errors loss of formal Bayes estimators. Ann Math Statist. JSTOR; 1970;: 446–456. .
1969
Inadmissibility of the best invariant estimator of extreme quantiles of the normal law under squared error loss. The Annals of Mathematical Statistics. 1969;: 1801–1808. .
A representation of Bayes invariant procedures in terms of Haar measure. Annals of the Institute of Statistical Mathematics. Springer; 1969; 21: 291–308. .
1967
On the admissibility of formal Bayes estimators. Stanford, California: Department of Statistics, Stanford University; 1967. .
1965
A sequence of limiting distributions of response probabilities. Psychometrika. Springer; 1965; 30: 491–497. .
Approximations to the distribution function of sums of independent chi random variables. Stanford, California: Department of Statistics, Stanford University; 1965. .
A waiting time distribution arising from the coupon collector's problem. Stanford, California: Department of Statistics, Stanford University; 1965. .
1964
Calculation of upper tail percentiles for the chi-square distribution(Procedure for determining upper tail percentiles of chi-square distribution with arbitrary number of degrees of freedom- numerical integration). Stanford, California: Department of Statistics, Stanford University; 1964. .
1963
Asymptotic Distributions of Response Probabilities for a Stochastic Learning Model. University of Alberta; 1963. .
197
Improving on equivariant estimators. Ann. Statist. JSTOR; 197AD;: 21–38. .
An entropy based review of selected NADP-NTN network sites for. Atmospheric Environment. : 2089–2103. .
Bayesian analysis of accumulated damage models in lumber reliability. Technometrics. .
Statistics and Manufactured Forest Products: Assessing Their Engineering Properties in a Changing World. Annual Review of Statistics and Its Applications. Annual Reviews 4139 El Camino Way, PO Box 10139, Palo Alto, California 94303-0139, USA; 3: Submitted. .
A general theory for preferential sampling in environamental networks. Annals of Applied Statistics. .
A general theory for preferential sampling in environamental networks. Annals of Applied Statistics. .
A general theory for preferential sampling in environamental networks. Annals of Applied Statistics. .