Proof Compression and NP Versus PSPACE II: Addendum
Proof Compression and NP Versus PSPACE II: Addendum
Author(s): Lew Gordeev, E. Hermann HaeuslerSubject(s): Philosophy, Logic, Philosophy of Science
Published by: Wydawnictwo Uniwersytetu Łódzkiego
Keywords: graph theory; natural deduction; computational complexity
Summary/Abstract: In our previous work we proved the conjecture NP = PSPACE by advanced proof theoretic methods that combined Hudelmaier’s cut-free sequent calculus for minimal logic (HSC) with the horizontal compressing in the corresponding minimal Prawitz-style natural deduction (ND). In this Addendum we show how to prove a weaker result NP = coNP without referring to HSC. The underlying idea (due to the second author) is to omit full minimal logic and compress only “naive” normal tree-like ND refutations of the existence of Hamiltonian cycles in given non-Hamiltonian graphs, since the Hamiltonian graph problem in NPcomplete. Thus, loosely speaking, the proof of NP = coNP can be obtained by HSC-elimination from our proof of NP = PSPACE.
Journal: Bulletin of the Section of Logic
- Issue Year: 51/2022
- Issue No: 2
- Page Range: 197-205
- Page Count: 9
- Language: English