Information in propositional proofs and algorithmic proof search
Abstract
We study from the proof complexity perspective the (informal) proof search problem: Is there an optimal way to search for propositional proofs? We note that for any fixed proof system there exists a time-optimal proof search algorithm. Using classical proof complexity results about reflection principles we prove that a time-optimal proof search algorithm exists without restricting proof systems iff a p-optimal proof system exists. To characterize precisely the time proof search algorithms need for individual formulas we introduce a new proof complexity measure based on algorithmic information concepts. In particular, to a proof system we attach {\bf information-efficiency function} assigning to a tautology a natural number, and we show that: - characterizes time any -proof search algorithm has to use on and that for a fixed there is such an information-optimal algorithm, - a proof system is information-efficiency optimal iff it is p-optimal, - for non-automatizable systems there are formulas with short proofs but having large information measure . We isolate and motivate the problem to establish unconditional super-logarithmic lower bounds for where no super-polynomial size lower bounds are known. We also point out connections of the new measure with some topics in proof complexity other than proof search.
Cite
@article{arxiv.2104.04711,
title = {Information in propositional proofs and algorithmic proof search},
author = {Jan Krajicek},
journal= {arXiv preprint arXiv:2104.04711},
year = {2022}
}
Comments
Preliminary version February 2021