Decomposing a factorial into large factors

Abstract

Let t(N) denote the largest number such that N! can be expressed as the product of N integers greater than or equal to t(N). The bound t(N)/N = 1/e-o(1) was apparently established in unpublished work of Erdos, Selfridge, and Straus; but the proof is lost. Here we obtain the more precise asymptotic t(N)N = 1e - c0 N + O( 11+c N ) for an explicit constant c0 = 0.30441901… and some absolute constant c>0, answering a question of Erdos and Graham. For the upper bound, a further lower order term in the asymptotic expansion is also obtained. With numerical assistance, we obtain highly precise computations of t(N) for wide ranges of N, establishing several explicit conjectures of Guy and Selfridge on this sequence. For instance, we show that t(N) ≥ N/3 for N ≥ 43632, with the threshold shown to be best possible.

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