The uniform distribution of sequences generated by iterated polynomials

Abstract

Assume that m,s∈ N, m>1, while f is a polynomial with integer coefficients, deg~f>1, f(i) is the ith iteration of the polynomial f, n has a discrete uniform distribution on the set \0,1,…,mn - 1\. We are going to prove that with n tending to infinity random vectors (nmn,f(n) mnmn,…,f(s - 1)(n) mnmn) weakly converge to a vector having a continuous uniform distribution in the s-dimensional unit cube. Analogous results were obtained earlier only for some classes of polynomials with s≤slant 3, deg~f = 2. The mentioned vectors represent sequential pseudorandom numbers produced by a polynomial congruential generator modulo mn.