Wesley Calvert
Published 2004-06-24Version 1
Theories of classification distinguish classes with some good structure theorem from those for which none is possible. Some classes (dense linear orders, for instance) are non-classifiable in general, but are classifiable when we consider only countable members. This paper explores such a notion for classes of computable structures by working out a sequence of examples. We follow recent work by Goncharov and Knight in using the degree of the isomorphism problem for a class to distinguish classifiable classes from non-classifiable. In this paper, we calculate the degree of the isomorphism problem for Abelian $p$-groups of bounded Ulm length. The result is a sequence of classes whose isomorphism problems are cofinal in the hyperarithmetical hierarchy. In the process, new back-and-forth relations on such groups are calculated.
The isomorphism problem for classes of computable fields
Multiplicative structures and random walks in o-minimal groups
On $Σ_1^1$-completeness of quasi-orders on $κ^κ$
![QR code for arXiv:math/0406505 [math.LO]](http://oss.arxitics.com/images/favicon.svg)