A counterexample to the Conjecture of Ankeny, Artin and Chowla

Abstract

Let p be a prime number with p 1 4, let ω=1+p2, let >1 be the fundamental unit of Z[ω] and let x and y be the unique nonnegative integers with =x+yω. The Ankeny-Artin-Chowla-Conjecture states that p is not a divisor of y. In this note, we provide and discuss a counterexample to this conjecture.

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