Maximal Inequalities for Separately Exchangeable Empirical Processes

This paper derives new maximal inequalities for empirical processes associated with separately exchangeable (SE) random arrays. For any fixed index dimension \(K\ge 1\), we establish a global maximal inequality that bounds the \(q\)-th moment, for any \(q\in[1,\infty)\), of the supremum of these processes. In addition, we obtain a refined local maximal inequality that controls the first absolute moment of the supremum. Both results are proved for a general pointwise measurable class of functions.