A Finitely Supported Frame for the Turing Schmerl Calculus

Eduardo Hermo Reyes

Published 2018-04-27Version 1

In arXiv:1604.08705 we introduced the propositional modal logic $\textbf{TSC}$ (which stands for Turing Schmerl Calculus) which adequately describes the provable interrelations between different kinds of Turing progressions. In arXiv:1709.04715 we defined a model $\mathcal{J}$ which is proven to be a universal model for $\textbf{TSC}$ based on the intensively studied Ignatiev's universal model for the closed fragment of $\textbf{GLP}$ (G\"odel L\"ob's polymodal provability logic). In the current paper we present a new universal frame $\mathcal{H}$, which is a slight modification of $\mathcal{J}$, and whose domain allows for a modal definability of each of its worlds.