English

Capturing the polynomial hierarchy by second-order revised Krom logic

Logic in Computer Science 2024-02-14 v4 Computational Complexity

Abstract

We study the expressive power and complexity of second-order revised Krom logic (SO-KROMr^{r}). On ordered finite structures, we show that its existential fragment Σ11\Sigma^1_1-KROMr^r equals Σ11\Sigma^1_1-KROM, and captures NL. On all finite structures, for k1k\geq 1, we show that Σk1\Sigma^1_{k} equals Σk+11\Sigma^1_{k+1}-KROMr^r if kk is even, and Πk1\Pi^1_{k} equals Πk+11\Pi^1_{k+1}-KROMr^r if kk is odd. The result gives an alternative logic to capture the polynomial hierarchy. We also introduce an extended version of second-order Krom logic (SO-EKROM). On ordered finite structures, we prove that SO-EKROM collapses to Π21\Pi^{1}_{2}-EKROM and equals Π11\Pi^1_1. Both SO-EKROM and Π21\Pi^{1}_{2}-EKROM capture co-NP on ordered finite structures.

Cite

@article{arxiv.2207.09226,
  title  = {Capturing the polynomial hierarchy by second-order revised Krom logic},
  author = {Kexu Wang and Shiguang Feng and Xishun Zhao},
  journal= {arXiv preprint arXiv:2207.09226},
  year   = {2024}
}
R2 v1 2026-06-25T01:02:54.430Z