Coding in graphs and linear orderings

Abstract

There is a Turing computable embedding of directed graphs A in undirected graphs. Moreover, there is a fixed tuple of formulas that give a uniform interpretation; i.e., for all directed graphs A, these formulas interpret A in (G). It follows that A is Medvedev reducible to (A) uniformly; i.e., there is a fixed Turing operator that serves for all A. We observe that there is a graph G that is not Medvedev reducible to any linear ordering. Hence, G is not effectively interpreted in any linear ordering. Similarly, there is a graph that is not interpreted in any linear ordering using computable 2 formulas. Any graph can be interpreted in a linear ordering using computable 3 formulas. Friedman and Stanley gave a Turing computable embedding L of directed graphs in linear orderings. We show that there is no fixed tuple of Lω1,ω formulas that, for all G, interpret the input graph G in the output linear ordering L(G). Harrison-Trainor and Montalb\'an have also shown this, by a quite different proof.