Capítulo de Libro
Decision P Systems and the P =NP Conjecture
Autor/es | Pérez Jiménez, Mario de Jesús
Romero Jiménez, Álvaro Sancho Caparrini, Fernando |
Departamento | Universidad de Sevilla. Departamento de Ciencias de la Computación e Inteligencia Artificial |
Fecha de publicación | 2003 |
Fecha de depósito | 2016-10-24 |
Publicado en |
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ISBN/ISSN | 978-3-540-00611-4 0302-9743 |
Resumen | We introduce decision P systems, which are a class of P
systems with symbol-objects and external output. The main result of
the paper is the following: if there exists an NP–complete problem that
cannot be solved in ... We introduce decision P systems, which are a class of P systems with symbol-objects and external output. The main result of the paper is the following: if there exists an NP–complete problem that cannot be solved in polynomial time, with respect to the input length, by a deterministic decision P system constructed in polynomial time, then P = NP. From Zandron-Ferreti-Mauri’s theorem it follows that if P = NP, then no NP–complete problem can be solved in polynomial time, with respect to the input length, by a deterministic P system with active membranes but without membrane division, constructed in polynomial time from the input. Together, these results give a characterization of P = NP in terms of deterministic P systems. |
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