Alternative space definitions for P systems with active membranes-Reference-Cited by-同舟云学术

Alternative space definitions for P systems with active membranes

Published:2021-04-16 Issue:2 Volume:3 Page:87-96
ISSN:2523-8906
Container-title:Journal of Membrane Computing
language:en
Short-container-title:J Membr Comput

Author:

Alhazov Artiom^ORCID,Leporati Alberto^ORCID,Manzoni Luca^ORCID,Mauri Giancarlo^ORCID,Zandron Claudio^ORCID

Abstract

AbstractThe first definition of space complexity for P systems was based on a hypothetical real implementation by means of biochemical materials, and thus it assumes that every single object or membrane requires some constant physical space. This is equivalent to using a unary encoding to represent multiplicities for each object and membrane. A different approach can also be considered, having in mind an implementation of P systems in silico; in this case, the multiplicity of each object in each membrane can be stored using binary numbers, thus reducing the amount of needed space. In this paper, we give a formal definition for this alternative space complexity measure, we define the corresponding complexity classes and we compare such classes both with standard space complexity classes and with complexity classes defined in the framework of P systems considering the original definition of space.

Funder

Università degli Studi di Milano - Bicocca

Publisher

Springer Science and Business Media LLC

Subject

Applied Mathematics,Computational Theory and Mathematics

Link

https://link.springer.com/content/pdf/10.1007/s41965-021-00074-2.pdf

Reference40 articles.

1. Alhazov, A., & Ishdorj, T. (2004). Membrane operations in P systems with active membranes. In: Păun, Gh., Riscos-Núñez, A., Romero-Jiménez, A., Sancho-Caparrini, F. (eds.) Second Brainstorming Week on Membrane Computing. pp. 37–44. No. 1/2004 in RGNC Reports, Fénix Editora.

2. Alhazov, A., Leporati, A., Mauri, G., Porreca, A.E., & Zandron, C. (2012). The computational power of exponential-space P systems with active membranes. In: Martínez-del-Amor, M.A., Păun, Gh., Pérez-Hurtado, I., Romero-Campero, F.J. (eds.) Tenth Brainstorming Week on Membrane Computing, Volume I. pp. 35–60. No. 1/2012 in RGNC Reports, Fénix Editora, http://www.gcn.us.es/icdmc2012_proceedings.

3. Alhazov, A., Leporati, A., Mauri, G., Porreca, A. E., & Zandron, C. (2014). Space complexity equivalence of P systems with active membranes and Turing machines. Theoretical Computer Science, 529, 69–81. https://doi.org/10.1016/j.tcs.2013.11.015.

4. Alhazov, A., & Pan, L. (2004). Polarizationless P systems with active membranes. Grammars, 7, 141–159.

5. Alhazov, A., Pan, L., & Păun, Gh. (2004). Trading polarizations for labels in P systems with active membranes. Acta Informatica, 41(2–3), 111–144. https://doi.org/10.1007/s00236-004-0153-z.

Cited by 4 articles. 订阅此论文施引文献订阅此论文施引文献，注册后可以免费订阅5篇论文的施引文献，订阅后可以查看论文全部施引文献

1. On maximal parallel application of rules in rewriting P systems;Journal of Membrane Computing;2023-08-24

2. Evaluating space measures in P systems;Journal of Membrane Computing;2022-09

3. Bio-inspired modelling as a practical tool to manage giant panda population dynamics in captivity;Natural Computing;2022-07-12

4. On the power of P systems with active membranes using weak non-elementary membrane division;Journal of Membrane Computing;2021-10-05