Go to DBLP homepageReachability in Trace-Pushdown Systems
Abstract: We consider the reachability relation of pushdown systems whose pushdown holds a Mazurkiewicz trace instead of just a word as in classical systems. Under two natural conditions on the transition structure of such systems, we prove that the reachability relation is lc-rational, a new notion that restricts the class of rational trace relations. We also develop the theory of these lc-rational relations to the point where they allow to infer that forwards-reachability of a trace-pushdown system preserves the rationality and backwards-reachability the recognizability of sets of configurations. As a consequence, we obtain that it is decidable whether one recognizable set of configurations can be reached from some rational set of configurations. All our constructions are polynomial (assuming the dependence alphabet to be fixed). These findings generalize results by Caucal on classical pushdown systems (namely the rationality of the reachability relation of such systems) and complement results by Zetzsche (namely the decidability for arbitrary transition structures under severe restrictions on the dependence alphabet).
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