We solve affirmatively a new special case of the P conjecture by Gh. Păun, which states that P systems with active membranes without charges and without non-elementary membrane division cannot solve NP -complete problems in polynomial time. The variant we consider is monodirectional, i.e., without send-in communication rules, shallow, i.e., with membrane structures consisting of only one level besides the external membrane, and deterministic, rather than more generally confluent. We describe a polynomial-time Turing machine simulation of this variant of P systems, exploiting a generalised version of dependency graphs for P systems which, unlike the original version introduced by Cordón-Franco et al., also takes membrane dissolution into account.
Leporati, A., Manzoni, L., Mauri, G., Porreca, A., Zandron, C. (2018). Solving a special case of the P conjecture using dependency graphs with dissolution. In 18th International Conference on Membrane Computing, Revised selected papers (pp.196-213). Springer Verlag [10.1007/978-3-319-73359-3_13].
Solving a special case of the P conjecture using dependency graphs with dissolution
Leporati, Alberto;Manzoni, Luca;Mauri, Giancarlo;Porreca, Antonio E.;Zandron, Claudio
2018
Abstract
We solve affirmatively a new special case of the P conjecture by Gh. Păun, which states that P systems with active membranes without charges and without non-elementary membrane division cannot solve NP -complete problems in polynomial time. The variant we consider is monodirectional, i.e., without send-in communication rules, shallow, i.e., with membrane structures consisting of only one level besides the external membrane, and deterministic, rather than more generally confluent. We describe a polynomial-time Turing machine simulation of this variant of P systems, exploiting a generalised version of dependency graphs for P systems which, unlike the original version introduced by Cordón-Franco et al., also takes membrane dissolution into account.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
