Title :
The complexity of treelike systems over λ-local formulae
Author :
Galesi, Nicola ; Thapen, Neil
Author_Institution :
Departament de Llenguatges i Sistemes Informatics, Univ. Politecnica de Catalunya, Barcelona, Spain
Abstract :
We describe a system LK(c[λ]) for refuting CNF formulae, as a restriction of the sequent calculus in which every formula in a sequent is defined over at most λ variables. This further generalizes the system Res(k), a generalization of Resolution to k-DNF introduced in (Krajicek, 2001). We adapt the Pudlak-Impagliazzo game (Pudlak and Impagliazzo, 2000) to prove lower bounds for treelike LK(c[λ]). We show that dynamic satisfiability, which was introduced in (Esteban et al., 2002) to study resolution space complexity, is a sufficient "but not necessary" condition to obtain exponential lower bounds.
Keywords :
computability; computational complexity; game theory; lambda calculus; trees (mathematics); λ variables; λ-local formulae; CNF formulae; Pudlak-Impagliazzo game; exponential lower bound; resolution space complexity; satisfiability; sequent calculus; treelike systems complexity; Calculus; Computer science; Delay;
Conference_Titel :
Computational Complexity, 2004. Proceedings. 19th IEEE Annual Conference on
Print_ISBN :
0-7695-2120-7
DOI :
10.1109/CCC.2004.1313798
