Separations in Proof Complexity and TFNP
Abstract
It is well-known that Resolution proofs can be efficiently simulated by Sherali-Adams (SA) proofs. We show, however, that any such simulation needs to exploit huge coefficients: Resolution cannot be efficiently simulated by SA when the coefficients are written in unary. We also show that Reversible Resolution (a variant of MaxSAT Resolution) cannot be efficiently simulated by Nullstellensatz (NS). These results have consequences for total NP search problems. First, we characterise the classes PPADS, PPAD, SOPL by unary-SA, unary-NS, and Reversible Resolution, respectively. Second, we show that, relative to an oracle, PLS PPP, SOPL PPA, and EOPL UEOPL. In particular, together with prior work, this gives a complete picture of the black-box relationships between all classical TFNP classes introduced in the 1990s.
Cite
@article{arxiv.2205.02168,
title = {Separations in Proof Complexity and TFNP},
author = {Mika Göös and Alexandros Hollender and Siddhartha Jain and Gilbert Maystre and William Pires and Robert Robere and Ran Tao},
journal= {arXiv preprint arXiv:2205.02168},
year = {2024}
}