论文信息 - THE SIZE OF THE LARGEST PART OF RANDOM PLANE PARTITIONS OF LARGE INTEGERS

THE SIZE OF THE LARGEST PART OF RANDOM PLANE PARTITIONS OF LARGE INTEGERS

We study the asymptotic behavior of the largest part size 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 this characteristic, appropriately normalized, tends weakly, as n → ∞, to a random variable having an extreme value probability distribution with distribution function, equal to e−e −z ,−∞ < z < ∞. The representation of a plane partition as a solid diagram shows that the same limit theorem holds for the numbers of rows and columns of a random plane partition of n.

Ljuben Mutafchiev

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