Normal numbers and normality measure

Abstract

The normality measure N has been introduced by Mauduit and S\'ark\"ozy in order to describe the pseudorandomness properties of finite binary sequences. Alon, Kohayakawa, Mauduit, Moreira and R\"odl proved that the minimal possible value of the normality measure of an N-element binary sequence satisfies (1/2 + o(1)) 2 N ≤ EN ∈ \0,1\N N(EN) ≤ 3 N1/3 ( N)2/3 for sufficiently large N. In the present paper we improve the upper bound to c ( N)2 for some constant c, by this means solving the problem of the asymptotic order of the minimal value of the normality measure up to a logarithmic factor, and disproving a conjecture of Alon et al.. The proof is based on relating the normality measure of binary sequences to the discrepancy of normal numbers in base 2.