Some Results on Circuit Lower Bounds and Derandomization of Arthur-Merlin Problems

Abstract

We prove a downward separation for 2-time classes. Specifically, we prove that if 2E does not have polynomial size non-deterministic circuits, then 2SubEXP does not have fixed polynomial size non-deterministic circuits. To achieve this result, we use Santhanam's technique on augmented Arthur-Merlin protocols defined by Aydinlioglu and van Melkebeek. We show that augmented Arthur-Merlin protocols with one bit of advice do not have fixed polynomial size non-deterministic circuits. We also prove a weak unconditional derandomization of a certain type of promise Arthur-Merlin protocols. Using Williams' easy hitting set technique, we show that 2-promise AM problems can be decided in 2SubEXP with nc advice, for some fixed constant c.