The least modulus for which consecutive polynomial values are distinct

Abstract

Let d4 and c∈(-d,d) be relatively prime integers. We show that for any sufficiently large integer n (in particular n>24310 suffices for 4 d 36), the smallest prime p c d with p(2dn-c)/(d-1) is the least positive integer m with 2r(d)k(dk-c)\ (k=1,…,n) pairwise distinct modulo m, where r(d) is the radical of d. We also conjecture that for any integer n>4 the least positive integer m such that |\k(k-1)/2\ mod\ m:\ k=1,…,n\|= |\k(k-1)/2\ mod\ m+2:\ k=1,…,n\|=n is the least prime p 2n-1 with p+2 also prime.