Prime numbers with an almost prime reverse
Abstract
Let b be an integer greater than or equal to 2. For any integer n∈ [bλ-1, bλ-1], we denote by Rλ (n) the reverse of n in base b, obtained by reversing the order of the digits of n. We establish a Bombieri-Vinogradov type theorem for the set of the reverses of the prime numbers. Combined with sieve methods, this permits us to prove that there exist b∈N and cb>0 such that, for at least cb bλ λ -2 primes p∈ [bλ-1, bλ-1], the reverse Rλ(p) has at most b prime factors. Some explicit admissible values of b are given.
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