MathDB

Let

\alpha(n)

be the number of digits equal to one in the dyadic representation of a positive integer

n

. Prove that [*] the inequality

\alpha(n^2 ) \le \frac{1}{2} \alpha(n) (1+\alpha(n))

holds, [*] equality is attained for infinitely

n\in\mathbb{N}

, [*] there exists a sequence

\{n_i\}

such that

\lim_{i \to \infty} \frac{ \alpha({n_{i}}^2 )}{ \alpha(n_{i}) } = 0

15