On the minimal length of addition chains

Abstract

We denote by (n) the minimal length of an addition chain leading to n and we define the counting function F(m,r):=\#\n∈[2m, 2m+1):(n) m+r\, where m is a positive integer and r 0 is a real number. We show that for 0< c< 2 and for any >0, we have as m ∞, F(m,cm m)<(cm+ m m m) and F(m,cm m)>(cm-(1+)cm m m). This extends a result of Erdos which says that for almost all n, as n∞, (n)= n 2+(1+o(1)) n n.

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