The Combinatorics of Barrier Synchronization

July 03, 2019 Β· Declared Dead Β· πŸ› Applications and Theory of Petri Nets

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Authors Olivier Bodini, Matthieu Dien, Antoine Genitrini, FrΓ©dΓ©ric Peschanski arXiv ID 1907.04243 Category cs.PL: Programming Languages Cross-listed cs.LO Citations 4 Venue Applications and Theory of Petri Nets Last Checked 4 months ago
Abstract
In this paper we study the notion of synchronization from the point of view of combinatorics. As a first step, we address the quantitative problem of counting the number of executions of simple processes interacting with synchronization barriers. We elaborate a systematic decomposition of processes that produces a symbolic integral formula to solve the problem. Based on this procedure, we develop a generic algorithm to generate process executions uniformly at random. For some interesting sub-classes of processes we propose very efficient counting and random sampling algorithms. All these algorithms have one important characteristic in common: they work on the control graph of processes and thus do not require the explicit construction of the state-space.
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