On the maximal sum of the entries of a matrix power
Abstract
Let pn be the maximal sum of the entries of A2, where A is a square matrix of size n, consisting of the numbers 1,2,…,n2, each appearing exactly once. We prove that mn=(n7). More precisely, we show that n(240n6+28n5+364n4+210n2-28n+26-105((-1)n+1))/840≤ pn≤ n3(n2+1)(7n2+5)/24.
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