Definability and decidability for rings of integers in totally imaginary fields
Abstract
We show that the ring of integers of Qtr is existentially definable in the ring of integers of Qtr(i), where Qtr denotes the field of all totally real numbers. This implies that the ring of integers of Qtr(i) is undecidable and first-order non-definable in Qtr(i). More generally, when L is a totally imaginary quadratic extension of a totally real field K, we use the unit groups R× of orders R⊂eq OL to produce existentially definable totally real subsets X⊂eq OL. Under certain conditions on K, including the so-called JR-number of OK being the minimal value JR(OK) = 4, we deduce the undecidability of OL. This extends previous work which proved an analogous result in the opposite case JR(OK) = ∞. In particular, unlike prior work, we do not require that L contains only finitely many roots of unity.
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