On the Statistical Independence of Shift-Register Pseudorandom Multisequence over Part of the Period
Abstract
In this paper we construct a pseudorandom multisequence (xn1,...,nr) based on kth-order linear recurrences modulo p, such that the discrepancy of the s-dimensional multisequence (xn1+i1,...,nr+ir)1 ≤ ij ≤ sj, 1 ≤ j ≤ r 1 ≤ nj ≤ Nj, 1 ≤ j ≤ r is equal to O((N1 ... Nr)-1/2 s+3r(N1 ... Nr)), where s=s1 ... sr, for all N1,...,Nr with $1 < N1 ... Nr ≤ pk
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