A Propositional Linear Time Logic with Time Flow Isomorphic to ω2

Abstract

Primarily guided with the idea to express zero-time transitions by means of temporal propositional language, we have developed a temporal logic where the time flow is isomorphic to ordinal ω2 (concatenation of ω copies of ω). If we think of ω2 as lexicographically ordered ω× ω, then any particular zero-time transition can be represented by states whose indices are all elements of some \n\×ω. In order to express non-infinitesimal transitions, we have introduced a new unary temporal operator [ω] (ω-jump), whose effect on the time flow is the same as the effect of α α+ω in ω2. In terms of lexicographically ordered ω× ω, [ω] φ is satisfied in \ < i,j\ >-th time instant iff φ is satisfied in \ < i+1,0\ >-th time instant. Moreover, in order to formally capture the natural semantics of the until operator U, we have introduced a local variant u of the until operator. More precisely, φ\, u is satisfied in \ < i,j\ >-th time instant iff is satisfied in \ < i,j+k\ >-th time instant for some nonnegative integer k, and φ is satisfied in \ < i,j+l\ >-th time instant for all 0≤slant l<k. As in many of our previous publications, the leitmotif is the usage of infinitary inference rules in order to achieve the strong completeness.