Short Res*(polylog) refutations if and only if narrow Res refutations

Abstract

In this note we show that any k-CNF which can be refuted by a quasi-polynomial Res*(polylog) refutation has a "narrow" refutation in Res (i.e., of poly-logarithmic width). We also show the converse implication: a narrow Resolution refutation can be simulated by a short Res*(polylog) refutation. The author does not claim priority on this result. The technical part of this note bears similarity with the relation between d-depth Frege refutations and tree-like d+1-depth Frege refutations outlined in (Kraj\'icek 1994, Journal of Symbolic Logic 59, 73). Part of it had already been specialized to Res and Res(k) in (Esteban et al. 2004, Theor. Comput. Sci. 321, 347).