The $\mu$-calculus as an insertion-language for fairness arguments

Various principles of proof have been proposed to reason about fairness. This paper addresses—for the first time—the question in what formalism such fairness arguments can be couched. To wit: we prove that Park's monotone first-order µ-calculus, augmented with constants for all recursive ordinals can serve as an assertion-language for proving fair termination of do-loops. In particular, the weakest precondition for fair termination of a loop w.r.t. some postcondition is definable in it. The relevance of this result to proving eventualities in the temporal logic formalism of Manna and Pnuelis (in "Foundations of Computer Science IV, Part 2," Math. Centre Tracts, Vol. 159, Math. Centrum, Amsterdam, 1983) is discussed.