论文信息 - Shallow laconic P systems can count

Shallow laconic P systems can count

Uniform families of shallow P systems with active membranes and charges are known to characterize the complexity class $$\textsc {P}^{\#\textsf {P}}$$ P # P , since this kind of P systems are able to “count” the number of objects sent out by the dividing membranes. Such a power is absent in monodirectional systems, where no send-in rules are allowed: in this case, only languages in $$\textsc {P}^{\textsf {NP}}_\parallel $$ P ‖ NP can be recognized. Here, we show that even a tiny amount of communication (namely, allowing only a single send-in per membrane during the computation) is sufficient to achieve the ability to count and solve all problems in the class $$\textsc {P}^{\#\textsf {P}}_\parallel $$ P ‖ # P , where all queries are performed independently.

Giancarlo Mauri | Luca Manzoni | Alberto Leporati | Antonio E. Porreca | Claudio Zandron

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