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On the Unprovability of Circuit Size Bounds in Intuitionistic $\mathsf{S}^1_2$ (2404.11841v1)

Published 18 Apr 2024 in cs.LO and cs.CC

Abstract: We show that there is a constant $k$ such that Buss's intuitionistic theory $\mathsf{IS}1_2$ does not prove that SAT requires co-nondeterministic circuits of size at least $nk$. To our knowledge, this is the first unconditional unprovability result in bounded arithmetic in the context of worst-case fixed-polynomial size circuit lower bounds. We complement this result by showing that the upper bound $\mathsf{NP} \subseteq \mathsf{coNSIZE}[nk]$ is unprovable in $\mathsf{IS}1_2$.

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