Topological Transcendental Fields

Abstract

This article initiates the study of topological transcendental fields which are subfields of the topological field of all complex numbers such that consists of only rational numbers and a nonempty set of transcendental numbers. , with the topology it inherits as a subspace of , is a topological field. Each topological transcendental field is a separable metrizable zero-dimensional space and algebraically is (T), the extension of the field of rational numbers by a set T of transcendental numbers. It is proved that there exist precisely 20 countably infinite topological transcendental fields and each is homeomorphic to the space of rational numbers with its usual topology. It is also shown that there is a class of 220 of topological transcendental fields of the form (T) with T a set of Liouville numbers, no two of which are homeomorphic.