An error term in the Central Limit Theorem for sums of discrete random variables
Abstract
We consider sums of independent identically distributed random variables whose distributions have d+1 atoms. Such distributions never admit an Edgeworth expansion of order d but we show that for almost all parameters the Edgeworth expansion of order d-1 is valid and the error of the order d-1 Edgeworth expansion is typically of order n-d/2.
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