On consecutive sums in permutations
Abstract
We study the number of values taken by the sums Σi=uv-1 ai, where a1,a2,…,an is a permutation of 1,2,…,n and 1 ≤ u < v ≤ n+1. In particular, we show that for a random choice of a permutation, with high probability there are (1+e-24 +o(1)) n2 such sums. This answers an old question of Erdos and Harzheim. We also obtain non-trivial bounds on the maximum possible number of distinct sums, ranging over all permutations of 1,2,…,n. We close with some questions concerning the minimal possible number of distinct sums.
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