Polynomial p-adic Low-Discrepancy Sequences
Abstract
The classic example of a low-discrepancy sequence in Zp is (xn) = an+b with a ∈ Zpx and b ∈ Zp. Here we address the non-linear case and show that a polynomial f generates a low-discrepancy sequence in Zp if and only if it is a permutation polynomial p and p2. By this it is possible to construct non-linear examples of low-discrepancy sequences in Zp for all primes p. Moreover, we prove a criterion which decides for any given polynomial in Zp with p ∈ \ 3,5, 7\ if it generates a low-discrepancy sequence. We also discuss connections to the theories of Poissonian pair correlations and real discrepancy.
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