From G\"odel incompleteness to the consistency of circuit lower bounds

Abstract

We prove that the bounded arithmetic theory S12 is consistent with EXP ⊂eq P/poly. More generally, we show that certain separations of V12 from a theory T imply the consistency of T with EXP ⊂eq P/poly. For T=S12, Takeuti (1988) established such a separation using a variant of G\"odel's consistency statement. Analogous results hold for PSPACE ⊂eq P/poly but the required separations of theories are yet unknown. Finally, we give magnification results for the hardness of proving almost-everywhere versions of these lower bounds.