Selection of models in 2×2×2 contingency tables

Let r s r , r and c s c , . . . , c be positive integer partitions of N. Let ⌺ denote the set of all 2 = n arrays of nonnegative integers whose ith row sums to r and jth i column sums to c . We consider the problem of randomly generating an element from the j uniform distribution over ⌺ . This prob

We propose a simple and robust algorithm for exact inference in 2 x 2 contingency tables. It is based on recursive relations allowing efficient computation of odds-ratio estimates, confidence limits and p-values for Fisher's test. A factor of 3 10 is gained in terms of computer time compared with th

A modified exact test is proposed for 2 x 2 contingency tables. This test, which is based on a lees connervative definition of the concept of significance (STONE, 106s) is compared with a modified form of Pearson's X\* test and with Tocher's randomized exact (UMPU) test. The sizes of the new test li

Three approximations to the power function of the chi-square teat for the hypothema of 'no three factor interaction' in a 2 x2 x2 contingency table are introduced and compared. The firat method is baaed on the aampling distribution of the logarithm of the odds ratio, the second-on the noncentral dis