Primes from sums of two squares and missing digits
Abstract
Let A' be the set of integers missing any three fixed digits from their decimal expansion. We produce primes in a thin sequence by proving an asymptotic formula for counting primes of the form p = m2 + 2, with ∈ A'. The proof draws on ideas from the work of Friedlander-Iwaniec on primes of the form p = x2+y4, as well as ideas from the work of Maynard on primes with restricted digits.
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