A Probabilistic Higher-order Fixpoint Logic

Abstract

We introduce PHFL, a probabilistic extension of higher-order fixpoint logic, which can also be regarded as a higher-order extension of probabilistic temporal logics such as PCTL and the μp-calculus. We show that PHFL is strictly more expressive than the μp-calculus, and that the PHFL model-checking problem for finite Markov chains is undecidable even for the μ-only, order-1 fragment of PHFL. Furthermore the full PHFL is far more expressive: we give a translation from Lubarsky's μ-arithmetic to PHFL, which implies that PHFL model checking is 11-hard and 11-hard. As a positive result, we characterize a decidable fragment of the PHFL model-checking problems using a novel type system.