Highest perfect power of a product of integers less than x
Abstract
For x≥ 3, we define w(x) as the highest integer w for which there exist integers m, y≥ 1 and 1≤ n1<…<nm≤ x such that n1·s nm=yw. We show that \[w(x)=x(-(2+o(1)) x x).\]
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