Decomposition and Model Selection for Large Contingency Tables

The decomposition for the complete point symmetry model in a rectangular contingency table is shown. Also the respective decompositions for the local point symmetry model and the reverse local point symmetry model in a square contingency table are given. Moreover teat procedures for the decomposed m

A model aelection criterion for log-linear models with orthonormal basis for contingency tablea is developed ueing the Gauee discrepancy between the logarithms of'the freqnenciea. The wntribution of each parameter to the criterion may be determined eeprately. A teet for the hypothesis that the w e o

In a square contingency table the inclined point-symmetry model which is an extension of the point-symmet,ry model is propoeed and a decomposition for its model is shown. Moreover a test theory for the decomposed models and an example are given.

For square contingency tables with ordered categories, this paper gives s decomposition for h R B s n ' 8 (1983) linear diagonals-parameter symmetry (LDPS) model into GOODMAN'S (1971)) diagonals-parameter symmetry model and the linear diagonals-parameter marginal symmetry model introduced in this p

For square contingency tables with ordered Categories, AGBESTI (1983) considered the linear diagonals-parameter symmetry model. An extended model including that model is pro@ which has only one more parameter than that model. The model also includes the conditional symmetry model considered by MCCUL