A guided tour of minimal indices and shortest descriptions

Abstract.

The set of minimal indices of a Gödel numbering \(\varphi\) is defined as \({\rm MIN}_{\varphi} = \{e: (\forall i < e)[\varphi_i \neq \varphi_e]\}\). It has been known since 1972 that \({\rm MIN}_{\varphi} \equiv_{\mathrm{T}} \emptyset^{\prime \prime }\), but beyond this \({\rm MIN}_{\varphi}\) has remained mostly uninvestigated. This paper collects the scarce results on \({\rm MIN}_{\varphi}\) from the literature and adds some new observations including that \({\rm MIN}_{\varphi}\) is autoreducible, but neither regressive nor (1,2)-computable. We also study several variants of \({\rm MIN}_{\varphi}\) that have been defined in the literature like size-minimal indices, shortest descriptions, and minimal indices of decision tables. Some challenging open problems are left for the adventurous reader.