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This paper investigates the use of Edgeworth expansions for approximating the distribution function of the normalized sum of n independent and identically distributed lattice-valued random variables. We prove that the continuity-corrected Edgeworth series, using Sheppard-adjusted cumulants, is accurate to the same order in n as the usual Edgeworth approximation for continuous random variables. Finally, as a partial justification of the Sheppard adjustments, it is shown that if a continuous random variable Y is rounded into a discrete part D and a truncation error U, such that Y = D + U, then under suitable limiting conditions the truncation error is approximately uniformly distributed and independent of Y, but not independent of D.
Kolassa et al. (Fri,) studied this question.