Central Limit Theorem for (t,s)-sequences, I

Abstract

Let (Xn)n ≥ 0 be a digital (t,s)-sequence in base 2, Pm =(Xn)n=02m-1 , and let D(Pm, Y ) be the local discrepancy of Pm. Let T Y be the digital addition of T and Y, and let Ms,p (Pm) =( ∫[0,1)2s |D(Pm T , Y ) |p dT dY )1/p . In this paper, we prove that D(Pm T , Y ) / Ms,2 (Pm) weakly converge to the standard Gaussisian distribution for m → ∞, where T,Y are uniformly distributed random variables in [0,1)s. In addition, we prove that equation Ms,p (Pm) / Ms,2 (Pm) 12π∫-∞∞ |u|p e-u2/2 du for \; \; m ∞ , \;\; p>0. equation