On the Complexity of the Bi-infinite Post Correspondence Problem

Abstract

In the bi-infinite Post Correspondence Problem (), it is asked whether the same bi-infinite word can be constructed correspondingly from a given finite set of pairs of words. In this article, we study its complexity with respect to the arithmetical hierarchy and prove that it is in 02 (Π01 01) and, therefore, at the level 2 of the arithmetical hierarchy. For the proof, we present a sequence of reductions starting from the nonhalting of the Turing machine all the way to via infinite PCP, an s-shift infinite PCP and s-shift for all natural numbers s. In the process, we prove that the infinite PCP is undecidable for injective morphisms, and that the infinite injective PCP, s-shift infinite PCP, s-shift and the non-termination problem for (deterministic and reversible) semi-Thue systems are all Π01-complete.