An introduction to log-linear analysis and implementing the Newton-Raphson algorithm in APL2

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An introduction to log-linear analysis and implementing the Newton-Raphson algorithm in APL2

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International Conference on APL archive
Proceedings of the international conference on APL table of contents

Toronto, Ontario, Canada

Pages: 159 - 163

Year of Publication: 1993

ISBN:0-89791-612-3

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Author

Duncan McArthur

Georgia State University, Atlanta

Sponsor

SIGAPL: ACM Special Interest Group on APL Programming Language

Publisher

ACM New York, NY, USA

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ABSTRACT

This paper introduces the method of log-linear analysis for performing hypothesis testing on contingency tables. The reader will see a brief development of this topic beginning with Pearson's classic chi-square test and examples of analyses on two and three dimensional tables. The idea of hierarchical models and backward elimination are discussed. Finally, the APL2 implementation of the Newton-Raphson algorithm is described. Newton-Raphson is an iterative procedure for finding the roots of a function. It is used in log-linear analysis to find the maximum-likelihood estimation of expected frequencies that cannot be calculated from expressions in closed form.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	Bishop, Y. M., Fienberg, S. E., & Holland, P. W. (1975). Discrete Multivariate Analysis: Theory_ and Practice. Cambridge, MA: The MIT Press.
	2	Haberman, S. (1978). Analysis of Oualitative Data. 2 vols. New York: Academic Press.
	3	Kennedy, J. J. (1992). Analyzing Oualitative Data: Lo~-Linear Analysis for Behavioral Re~ach. (2nd edition). New York: Praeger.
	4	Bakeman, R., & Robinson, B. F., (In Prep). Understandin~ Lo~-Linear Ana!vsis with ILOG: An Interactive Aooroach.
	5	Pearson, K., (1900). On a criterion that a given system of deviations from the probable in the case of a correlated system of variables is such that it can reasonably be supposed to have arisen from random sampling. Philosophical Magazine, 50, 157-75.
	6	Deming, W.E., & Stephan, F.F. (1940). On a least squares adjustment of a sampled frequency table when the expected marginal totals are known. Ann. Math. Statist., 11, 427-444.