Median polish

The median polish is a simple and robust exploratory data analysis procedure proposed by the statistician John Tukey. The purpose of median polish is to find an additively-fit model for data in a two-way layout table (usually, results from a factorial experiment) of the form row effect + column effect + overall median. The median polish is a simple and robust exploratory data analysis procedure proposed by the statistician John Tukey. The purpose of median polish is to find an additively-fit model for data in a two-way layout table (usually, results from a factorial experiment) of the form row effect + column effect + overall median. Median polish utilizes the medians obtained from the rows and the columns of a two-way table to iteratively calculate the row effect and column effect on the data. The results are not meant to be sensitive to the outliers, as the iterative procedure uses the medians rather than the means. Suppose an experiment observes the variable Y under the influence of two variables. We can arrange the data in a two-way table in which one variable is constant along the rows and the other variable constant along the columns. Let i and j denote the position of rows and columns (e.g. yij denotes the value of y at the ith row and the jth column). Then we can obtain a simple linear regression equation: where b0, b1, b2 are constants, and xi and zj are values associated with rows and columns, respectively. The equation can be further simplified if no xi and zj values are present for the analysis: where ci and dj denote row effects and column effects, respectively. To carry out median polish: (1) find the row medians for each row, find the median of the row medians, record this as the overall effect.