The abc conjecture implies infinitely many non-Wieferich places for fixed bases in number fields
Abstract
Silverman showed that, assuming the abc conjecture, there are x non-Wieferich primes base a less than x silverman, for all non-zero a. This inspired Graves and Murty Graves, Chen and Ding Chen1 Chen2, and then Ding Ding to find growth results, assuming the abc conjecture, for non-Wieferich primes p base a, where p 1 k for integers k ≥ 2. In light of Murty, Srinivas, and Subramani's recent work on `the Wieferich primes conjecture' and Euclidean algorithms in number fields murty, number theorists need results on non-Wieferich places in number fields. We prove analogues of the results of Graves \& Murty and Ding, and show Ding's result holds for all bases a in all imaginary quadratic fields' rings of integers, with 31 explicitly listed exceptions. Along the way, we generalize useful results on rational integers to algebraic integers.
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