On the P VS NP Question: A New Proof of Inequality

Angelo Raffaele Meo

doi:10.3844/jcssp.2021.511.524

Research Article Open Access

On the P VS NP Question: A New Proof of Inequality

Angelo Raffaele Meo¹

¹ Accademia delle Scienze di Torino, Italy

Abstract

The analysis discussed in this study is based on a well-known NP-complete problem which is called “satisfiability problem or SAT”. From SAT a new NP-complete problem derives, which is described by a Boolean function of the number n of the clauses of SAT called “core function”. In this study a new proof is presented according which the number of gates of the minimal implementation of core function increases with n exponentially. Since the synthesis of core function is an NP-complete problem, this result can be considered as the proof of the theorem according which P and NP do not coincide.

Journal of Computer Science

Volume 17 No. 5, 2021, 511-524

DOI: https://doi.org/10.3844/jcssp.2021.511.524

Submitted On: 23 September 2020 Published On: 27 May 2021

How to Cite: Meo, A. R. (2021). On the P VS NP Question: A New Proof of Inequality. Journal of Computer Science, 17(5), 511-524. https://doi.org/10.3844/jcssp.2021.511.524

Copyright: © 2021 Angelo Raffaele Meo. This is an open access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original author and source are credited.

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Keywords

P-NP Question
Complexity
Boolean Functions
Satisfiability
Polynomial or Exponential Increase