Title | Bridging Membrane and Reaction Systems – Further Results and Research Topics |
Publication Type | Journal Papers |
Year of Publication | 2013 |
Authors | Paun, G., Pérez-Jiménez M. J., & Rozenberg G. |
Journal Title | Fundamenta Informaticae |
Publisher | IOS Press |
Place Published | Warsaw, Poland |
Volume | 127 |
Pages | 99-114 |
Date Published | 10/2013 |
Abstract | This paper continues an investigation into bridging two research areas concerned with natural computing: membrane computing and reaction systems. More specifically, the paper considers a transfer of two assumptions/axioms of reaction systems, non-permanency and the threshold assumption, into the framework of membrane computing. It is proved that: (1) spiking neural P systems with non-permanency of spikes assumption characterize the semilinear sets of numbers, and (2) symport/antiport P systems with threshold assumption (translated as ω multiplicity of objects) can solve SAT in polynomial time. Also, several open research problems are stated. |
Keywords | fypercomputation, Membrane computing, reaction system, SAT, semilinear set |
URL | http://iospress.metapress.com/content/y724g8012056k237/?issue=1&genre=article&spage=99&issn=0169-2968&volume=127 |
Issue | 1-4 |
Impact Factor | 0.479 |
Ranking | 202/251 - Q4 |
ISSN Number | 0169-2968 |
DOI | 10.3233/FI-2013-898 |