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We study the asymptotic behaviour of the trace (the sum of the diagonal parts) τn = τn(ω) of a plane partition ω of the positive integer n, assuming that ω is chosen uniformly at random from the set of all such partitions. We prove that (τnc0n2/3)/c1n1/3 log1/2n converges weakly, as n → ∞, to the standard normal distribution, where c0 = ζ(2)/ [2ζ(3)]2/3, c1 = √(1/3/) [2ζ(3)]1/3 and ζ(s) = Σj=1js.

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