English

Upper and Lower Bounds for the Linear Ordering Principle

Computational Complexity 2026-03-31 v3

Abstract

Korten and Pitassi (FOCS, 2024) defined a new complexity class L2PL_2^P as the polynomial-time Turing closure of the Linear Ordering Principle. They put it between MAMA (Merlin--Arthur protocols) and S2PS_2^P (the second symmetric level of the polynomial hierarchy). In this paper we sandwich L2PL_2^P between PprMAP^{prMA} and PprSBPP^{prSBP}. (The oracles here are promise problems, and SBPSBP is the only known class between MAMA and AMAM.) The containment in PprSBPP^{prSBP} is proved via an iterative process that uses a prSBPprSBP oracle to estimate the average order rank of a subset and find the minimum of a linear order. Another containment result of this paper is PprO2PO2PP^{prO_2^P} \subseteq O_2^P (where O2PO_2^P is the input-oblivious version of S2PS_2^P). These containment results altogether have several byproducts: We give an affirmative answer to an open question posed by of Chakaravarthy and Roy (Computational Complexity, 2011) whether PprMAS2PP^{prMA} \subseteq S_2^P, thereby settling the relative standing of the existing (non-oblivious) Karp-Lipton-style collapse results of Chakaravarthy and Roy (2011) and Cai (2007), We give an affirmative answer to an open question of Korten and Pitassi whether a Karp-Lipton-style collapse can be proven for L2PL_2^P, We show that the Karp-Lipton-style collapse to PprOMAP^{prOMA} is actually better than both known collapses to PprMAP^{prMA} due to Chakaravarthy and Roy (Computational Complexity, 2011) and to O2PO_2^P also due to Chakaravarthy and Roy (STACS, 2006). Thus we resolve the controversy between previously incomparable Karp-Lipton collapses stemming from these two lines of research.

Cite

@article{arxiv.2503.19188,
  title  = {Upper and Lower Bounds for the Linear Ordering Principle},
  author = {Edward A. Hirsch and Ilya Volkovich},
  journal= {arXiv preprint arXiv:2503.19188},
  year   = {2026}
}

Comments

This revision corresponds to Revision 1 of ECCC TR25-142

R2 v1 2026-06-28T22:33:07.575Z