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Sparse complete sets for coNP: Solution of the P versus NP problem
Version 1
: Received: 1 August 2019 / Approved: 5 August 2019 / Online: 5 August 2019 (03:31:23 CEST)
Version 2 : Received: 26 November 2019 / Approved: 29 November 2019 / Online: 29 November 2019 (07:28:14 CET)
Version 3 : Received: 4 April 2020 / Approved: 6 April 2020 / Online: 6 April 2020 (12:57:55 CEST)
Version 4 : Received: 15 April 2020 / Approved: 16 April 2020 / Online: 16 April 2020 (10:17:03 CEST)
Version 5 : Received: 18 September 2020 / Approved: 19 September 2020 / Online: 19 September 2020 (09:51:02 CEST)
Version 6 : Received: 10 February 2021 / Approved: 11 February 2021 / Online: 11 February 2021 (11:56:37 CET)
Version 7 : Received: 19 August 2021 / Approved: 27 August 2021 / Online: 27 August 2021 (14:09:47 CEST)
Version 8 : Received: 20 October 2021 / Approved: 26 October 2021 / Online: 26 October 2021 (11:07:59 CEST)
Version 9 : Received: 7 March 2024 / Approved: 8 March 2024 / Online: 8 March 2024 (11:06:11 CET)
Version 10 : Received: 14 March 2024 / Approved: 14 March 2024 / Online: 14 March 2024 (10:11:13 CET)
Version 11 : Received: 14 March 2024 / Approved: 15 March 2024 / Online: 18 March 2024 (08:29:48 CET)
Version 12 : Received: 29 March 2024 / Approved: 1 April 2024 / Online: 1 April 2024 (17:14:22 CEST)
Version 13 : Received: 6 April 2024 / Approved: 6 April 2024 / Online: 8 April 2024 (06:04:04 CEST)
Version 14 : Received: 11 April 2024 / Approved: 11 April 2024 / Online: 12 April 2024 (04:51:11 CEST)
Version 2 : Received: 26 November 2019 / Approved: 29 November 2019 / Online: 29 November 2019 (07:28:14 CET)
Version 3 : Received: 4 April 2020 / Approved: 6 April 2020 / Online: 6 April 2020 (12:57:55 CEST)
Version 4 : Received: 15 April 2020 / Approved: 16 April 2020 / Online: 16 April 2020 (10:17:03 CEST)
Version 5 : Received: 18 September 2020 / Approved: 19 September 2020 / Online: 19 September 2020 (09:51:02 CEST)
Version 6 : Received: 10 February 2021 / Approved: 11 February 2021 / Online: 11 February 2021 (11:56:37 CET)
Version 7 : Received: 19 August 2021 / Approved: 27 August 2021 / Online: 27 August 2021 (14:09:47 CEST)
Version 8 : Received: 20 October 2021 / Approved: 26 October 2021 / Online: 26 October 2021 (11:07:59 CEST)
Version 9 : Received: 7 March 2024 / Approved: 8 March 2024 / Online: 8 March 2024 (11:06:11 CET)
Version 10 : Received: 14 March 2024 / Approved: 14 March 2024 / Online: 14 March 2024 (10:11:13 CET)
Version 11 : Received: 14 March 2024 / Approved: 15 March 2024 / Online: 18 March 2024 (08:29:48 CET)
Version 12 : Received: 29 March 2024 / Approved: 1 April 2024 / Online: 1 April 2024 (17:14:22 CEST)
Version 13 : Received: 6 April 2024 / Approved: 6 April 2024 / Online: 8 April 2024 (06:04:04 CEST)
Version 14 : Received: 11 April 2024 / Approved: 11 April 2024 / Online: 12 April 2024 (04:51:11 CEST)
A peer-reviewed article of this Preprint also exists.
Vega, F. Note for the P versus NP Problem. IPI Letters 2024, 14–18, doi:10.59973/ipil.92. Vega, F. Note for the P versus NP Problem. IPI Letters 2024, 14–18, doi:10.59973/ipil.92.
Abstract
P versus NP is considered as one of the most important open problems in computer science. This consists in knowing the answer of the following question: Is P equal to NP? A precise statement of the P versus NP problem was introduced independently by Stephen Cook and Leonid Levin. Since that date, all efforts to find a proof for this problem have failed. Another major complexity class is coNP. Whether NP = coNP is another fundamental question that it is as important as it is unresolved. In 1979, Fortune showed that if any sparse language is coNP-complete, then P = NP. We prove there is a possible sparse language in coNP-complete. In this way, we demonstrate the complexity class P is equal to NP.
Keywords
Complexity Classes; Complement Language; Sparse; Completeness; Polynomial Time
Subject
Computer Science and Mathematics, Computer Science
Copyright: This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
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Commenter: Frank Vega
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