Let $ (H_s(n))_{n \geq 1} $ be an $s-$dimensional Halton's sequence. Let $D_N$ be the discrepancy of the sequence $ (H_s(n))_{n = 1}^{N} $. It is known that $ND_N =O(\ln^s N)$ as $N \to \infty $. In this paper we prove that this estimate is exact: $$ \overline{\lim}_{ N \to \infty} N \ln^{-s}(N) D_N >0. $$
On the lower bound of the discrepancy of (t; s) sequences: I
On the lower bound of the discrepancy of Halton's sequence II
On the lower bound of the discrepancy of $(t,s)$ sequences: II
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