Probabilistic discrepancy bound for Monte Carlo point sets

Abstract

By a profound result of Heinrich, Novak, Wasilkowski, and Woźniakowski the inverse of the star-discrepancy n*(s,) satisfies the upper bound n*(s,) ≤ cabs s -2. This is equivalent to the fact that for any N and s there exists a set of N points in [0,1]s whose star-discrepancy is bounded by cabs s1/2 N-1/2. The proof is based on the observation that a random point set satisfies the desired discrepancy bound with positive probability. In the present paper we prove an applied version of this result, making it applicable for computational purposes: for any given number q ∈ (0,1) there exists an (explicitly stated) number c(q) such that the star-discrepancy of a random set of N points in [0,1]s is bounded by c(q) s1/2 N-1/2 with probability at least q, uniformly in N and s.