Some structural complexity results for $\exists\mathbb R$
Abstract
The complexity class , standing for the complexity of deciding the existential first order theory of the reals as real closed field in the Turing model, has raised considerable interest in recent years. It is well known that NP PSPACE. In their compendium, Schaefer, Cardinal, and Miltzow give a comprehensive presentation of results together with a rich collection of open problems. Here, we answer some of them dealing with structural issues of as a complexity class. We show analogues of the classical results of Baker, Gill, and Solovay finding oracles which do and do not separate NP form , of Ladner's theorem showing the existence of problems in NP not being complete for (in case the two classes are different), as well as a characterization of by means of descriptive complexity.
Keywords
Cite
@article{arxiv.2502.00680,
title = {Some structural complexity results for $\exists\mathbb R$},
author = {Klaus Meer and Adrian Wurm},
journal= {arXiv preprint arXiv:2502.00680},
year = {2025}
}
Comments
16 pages, no figures, submitted to CiE 2025