Classification of σ-validity

Abstract

In their 2018 paper, Agotnes, van Ditmarsch, and Wang extended the notions of success and self-refutation in public announcements to true lies, impossible lies, and σ-validity in general, where σ is a finite or infinite sequence of 0s and 1s. For example, successful formulas and self-refuting formulas are 11-valid and 10-valid, respectively. They then posed a conjecture on the classification of such sequences in terms of σ-validity. In this paper, we disprove the conjecture and give corrected classifications for multi-agent K45, single-agent KD45, and multi-agent S5 after reformulating the statement more explicitly. We leave the multi-agent KD45 case with more than one agent open. The results indicate that there is an asymmetry between truthful announcements and false announcements: the former are stable while the latter are unstable. In particular, successful formulas remain true forever while impossible lies can be true at some point when repeatedly announced. Also, although self-refuting formulas can become true again after following the truth pattern 10, 100-valid formulas are destructive in the sense that they remain false forever once they become false. On the other hand, true lies are fragile in the sense that truths created by lying can become false again.

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