The Decompositions for Point Symmetry Models in Two-way Contingency Tables

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, 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

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

In (L squere oontingency teble four kindaof eymmetry modele are proposed and their decompositione are given. Two models of them areexteneions of the locsl point-eymmetry model and the reverse local point-symmetry model by TOXIZAWA (1086), and the other two models are concerned with the inclined poin

## Abstract We consider in this paper, the behaviour of a class of the CRESSIE READ (1984) power divergence test statistics indexed by parameter λ ‐ __I__ (λ), with the modified __X__~2~ test statistics (LU) proposed by LAWAL and UPTON (1984), for sparse contingency tables ranging from the 3×3 to t