Three notions of effective computation on R

Abstract

We compare three notions of effectiveness on uncountable structures. The first notion is that of a -computable structure, based on a model of computation proposed by Blum, Shub, and Smale, which uses full-precision real arithmetic. The second notion is that of an F-parameterizable structure, defined by Morozov and based on Mal'tsev's notion of a constructive structure. The third is -definability over HF(), defined by Ershov as a generalization of the observation that the computably enumerable sets are exactly those 1-definable in HF(N). We show that every -computable structure has an F-parameterization, but that the expansion of the real field by the exponential function is F-parameterizable but not -computable. We also show that the structures with -computable copies are exactly the structures with copies -definable over HF(). One consequence of this equivalence is a method of approximating certain -computable structures by Turing computable structures.