Ordered Binary Decision Diagrams, Pigeonhole Formulas and Beyond
Tveretina, Olga, Sinz, Carsten and Zantema, Hans
(2010)
Ordered Binary Decision Diagrams, Pigeonhole Formulas and Beyond.
pp. 35-58.
Groote and Zantema proved that a particular OBDD computation of the pigeonhole formula has exponential size, and that limited OBDD derivations cannot simulate resolution polynomially. Here we show that an arbitrary OBDD refutation of the pigeonhole formula has exponential size: we prove that for any order of computation at least one intermediate OBDD in the proof has size (1.14n). We also present a family of CNFs that show an exponential blow-up for all OBDD refutations compared to unrestricted resolution refutations.
| Item Type | Article |
|---|---|
| Uncontrolled Keywords | ordered binary decision diagrams, resolution, pigeonhole formulas, lower bounds |
| Date Deposited | 14 Nov 2024 10:46 |
| Last Modified | 14 Nov 2024 10:46 |