Non-Wieferich property of prime ideals and a conjecture of Erd\"os

Abstract

Let K be a number field with ring of integers O and α∈O. For any prime ideal p of O, we obtain its higher α-Wieferich property, which implies a nonexistence theorem for higher Wieferich unramified prime ideals. If β∈O is relatively prime to α and all prime ideal factors of (β) are unramified and have residue degree 1, we apply our higher α-Wieferich property to establish the asymptotic equidistribution of digits in β-adic expansions of αn, which is a generalization of the Dupuy-Weirich theorem. When (β) have ramified prime ideal factors, we also obtain a result on the block complexity of β-adic expansions of αn.