On digit patterns in expansions of rational numbers with prime denominator
Abstract
We show that, for any fixed > 0 and almost all primes p, the g-ary expansion of any fraction m/p with (m,p) = 1 contains almost all g-ary strings of length k < (5/24 - ) g p. This complements a result of J. Bourgain, S. V. Konyagin, and I. E. Shparlinski that asserts that, for almost all primes, all g-ary strings of length k < (41/504 -) g p occur in the g-ary expansion of m/p.
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