Almost all primes have a multiple of small Hamming weight
Abstract
Recent results of Bourgain and Shparlinski imply that for almost all primes p there is a multiple mp that can be written in binary as mp= 1+2m1+ ·s +2mk, 1≤ m1 < ·s < mk, with k=66 or k=16, respectively. We show that k=6 (corresponding to Hamming weight 7) suffices. We also prove there are infinitely many primes p with a multiplicative subgroup A=<g>⊂ Fp*, for some g ∈ \2,3,5\, of size |A| p/( p)3, where the sum-product set A· A+ A· A does not cover Fp completely.
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