On Parameterized Verification Over Tree Topologies
Abstract
Parameterized verification of finite-state processes with rendez-vous synchronization is notoriously undecidable when processes are linearly ordered. In this paper we study two kinds of bounds under which we determine the complexity of safety checking over tree topologies. When bounding the depth we obtain that the complexity is related to the fast growing hierarchy. Our second bound limits the alternations between upwards and downwards synchronizations in the tree (phases), and occurs naturally in many concrete settings. If we fix the number of phases then the complexity of safety checking is EXPSPACE complete, and if the number of phases is part of the input it is 2EXPSPACE complete (both for arbitrary depth).
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