Hadamard Matrices, Quaternions, and the Pearson Chi-square Statistic
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We present a symbolic decomposition of the Pearson chi-square statistic with unequal cell probabilities, by presenting Hadamard-type matrices whose columns are eigenvectors of the variance-covariance matrix of the cell counts. All of the eigenvectors have non-zero values so each component test uses all cell probabilities in a way that makes it intuitively interpretable. When all cell probabilities are distinct and unrelated we establish that such decomposition is only possible when the number of multinomial cells is a small power of 2. For higher powers of 2, we show, using the theory of orthogonal designs, that the targeted decomposition is possible when appropriate relations are imposed on the cell probabilities, the simplest of which is when the probabilities are equal and the decomposition is reduced to the one obtained by Hadamard matrices. Simulations are given to illustrate the sensitivity of various components to changes in location, scale skewness and tail probability, as well as to illustrate the potential improvement in power when the cell probabilities are changed.
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