Showing total 4 results

1. MULTIVARIATE LOGARITHMIC SERIES DISTRIBUTION AS A PROBABILITY MODEL IN POPULATION AND COMMUNITY ECOLOGY AND SOME OF ITS STATISTICAL PROPERTIES.

Author

Patil, Ganapati P. and Bildikar, Sheela

Subjects

*MULTIVARIATE analysis, *LOGARITHMS, *DISTRIBUTION (Probability theory), *LOGARITHMIC functions, *STATISTICAL correlation, *REGRESSION analysis, *ANALYSIS of variance

Abstract

A growing interest has been witnessed in recent, years in multivariate discrete probability models. The multivariate logarithmic series distribution (LSD) is a multivariate analogue of the univariate LSD. This paper investigates the marginal and the conditional distributions of the multivariate LSD. It. records its moment properties and also provides some regression and correlation analysis. An interesting modal property of the distribution is discovered. The paper also discusses the estimation of the parameters by the methods of maximum likelihood and unbiased minimum variance. At the end is discussed in detail an application of the multivariate LSD to the field of population and community ecology. [ABSTRACT FROM AUTHOR]

Published

1967

2. A NOMOGRAM FOR THE "STUDENT"-FISHER t TEST.

Author

Boyd, William C.

Subjects

*NOMOGRAPHY (Mathematics), *T-test (Statistics), *PROBABILITY theory, *ESTIMATION theory, *STATISTICAL correlation, *STATISTICAL hypothesis testing, *DISTRIBUTION (Probability theory), *ANALYSIS of variance

Abstract

The article presents information on a nomogram for the "Student"-fisher t test. A nomogram is given for estimating the probability (P) for a given value of the "Student"-Fisher t test. W.S. Gosset, an employee of the Guiness brewing company in Dublin, published papers in 1908 in which he correctly solved three problems: the probable error of a mean, the distribution of the mean divided by its estimated standard deviation and the distribution of the estimated correlation coefficient between independent variates. Later "Student" and economist R.A. Fisher calculated tables of the relevant t distribution and Fisher gives a table of t and probabilities, corresponding to various degrees of freedom. Fisher and F. Yates, scholar provide in addition a column for P. It seemed that presentation of the P, degrees of freedom, t relationship in the form of a nomogram would be advantageous. It makes possible a fairly exact estimate of probabilities less than 0.0001 and makes it possible to get an estimate of P for any value of t from 1 to 65, instead merely of selected values.

Published

1969

3. STATISTICAL DEPENDENCE BETWEEN RANDOM EFFECTS AND THE NUMBERS OF OBSERVATIONS ON THE EFFECTS FOR THE UNBALANCED ONE-WAY RANDOM CLASSIFICATION.

Author

Harville, David A.

Subjects

*RANDOM variables, *PROBABILITY theory, *STATISTICAL correlation, *ANALYSIS of variance, *EXPERIMENTAL design, *DISTRIBUTION (Probability theory), *MATHEMATICAL statistics, *REGRESSION analysis

Abstract

This paper deals with certain aspects of variance component estimation for the unbalanced one-way random classification where the number (N[sub I]) of observations in the ith class is treated as a random variable not necessarily independent of the class effect (A[sub iota]). It is assumed that in general P(N[sub I] = 0) > 0. The conditional expectations (given the number of observations in each class) of all estimators of the between variance component (sigma[sup 2, sub alpha]) belonging to a certain class of estimators are derived. A general expression is found for the expected value of that estimator of sigma[sup 2, sub alpha] yielded by analysis of variance of class means. The limit of this expression (as the number of classes arrow right Infinity) is given; and it is shown that, if the bivariate distribution function of A[sub I], N[sub I] belongs to a certain class of distribution functions, then this limit is less than sigma[sup 2, sub a]. Numerical approximations to the expected values of two estimators of sigma[sup 2, sub a] are presented for one subclass of such distribution functions. [ABSTRACT FROM AUTHOR]

Published

1967

4. A COMPUTER METHOD FOR CALCULATING KENDALL'S TAU WITH UNGROUPED DATA.

Author

Knight, William R.

Subjects

*DISTRIBUTION (Probability theory), *STATISTICAL correlation, *SORTING (Electronic computers), *STATISTICAL sampling, *PROBABILITY theory, *MOTIVATION (Psychology), *MATHEMATICAL statistics

Abstract

The experiments to be discussed in this article was designed to investigate empirically the distribution of the sample version of the measure of association (G), &b.gamma;. Professors, William H. Kruskal and Leo A. Goodman have published an article giving interpretive motivation for the coefficient, and have developed the large sample theory for G. In the present research, sampling experiments were performed to test the adequacy of the large sample theory for 5X5 population cross classifications and samples of size ten, twenty-five and fifty. The numerical experiment described in this paper was based on a number of 25 cells multinomial populations, each considered as represented by the probabilities in a 5X5 population cross classification. Gamma is defined by Goodman and Kruskal in terms of probabilities. The 100 population cross classifications were chosen to be representative of practical situations in psychology. The method use to obtain them was to begin with 5X5 cross classification having complete association along the main diagonal and with a variety of marginal distributions.

Published

1966