A Model-Theoretic Characterization of Constant-Depth Arithmetic Circuits
Computational Complexity
2020-05-08 v2 Logic in Computer Science
Abstract
We study the class of functions computed by constant-depth polynomial-size arithmetic circuits of unbounded fan-in addition and multiplication gates. No model-theoretic characterization for arithmetic circuit classes is known so far. Inspired by Immerman's characterization of the Boolean class , we remedy this situation and develop such a characterization of . Our characterization can be interpreted as follows: Functions in are exactly those functions counting winning strategies in first-order model checking games. A consequence of our results is a new model-theoretic characterization of , the class of languages accepted by constant-depth polynomial-size majority circuits.
Keywords
Cite
@article{arxiv.1603.09531,
title = {A Model-Theoretic Characterization of Constant-Depth Arithmetic Circuits},
author = {Anselm Haak and Heribert Vollmer},
journal= {arXiv preprint arXiv:1603.09531},
year = {2020}
}