Subproducts of small residue classes

Abstract

For any prime p, let y(p) denote the smallest integer y such that every reduced residue class p is represented by the product of some subset of \1,…,y\. It is easy to see that y(p) is at least as large as the smallest quadratic nonresidue p; we prove that y(p) p1/(4 e)+, thus strengthening Burgess's classical result. This result is of intermediate strength between two other results, namely Burthe's proof that the multiplicative group p is generated by the integers up to O(p1/(4 e)+, and Munsch and Shparlinski's result that every reduced residue class p is represented by the product of some subset of the primes up to O(p1/(4 e)+. Unlike the latter result, our proof is elementary and similar in structure to Burgess's proof for the least quadratic nonresidue.