The Worm Calculus

Abstract

We present a propositional modal logic WC, which includes a logical verum constant but does not have any propositional variables. Furthermore, the only connectives in the language of WC are consistency-operators α for each ordinal α. As such, we end up with a class-size logic. However, for all practical purposes, we can consider restrictions of WC up to a given ordinal. Given the restrictive signature of the language, the only formulas are iterated consistency statements, which are called worms. The theorems of WC are all of the form A B for worms A and B. The main result of the paper says that the well-known strictly positive logic RC, called Reflection Calculus, is a conservative extension of WC. As such, our result is important since it is the ultimate step in stripping spurious complexity off the polymodal provability logic GLP, as far as applications to ordinal analyses are concerned. Indeed, it may come as a surprise that a logic as weak as WC serves the purpose of computing something as technically involved as the proof theoretical ordinals of formal mathematical theories.