Structures with Small Orbit Growth
Abstract
Let be the class of all structures such that the automorphism group of has at most orbits in its componentwise action on the set of -tuples with pairwise distinct entries, for some constants with . We show that is precisely the class of finite covers of first-order reducts of unary structures, and also that is precisely the class of first-order reducts of finite covers of unary structures. It follows that the class of first-order reducts of finite covers of unary structures is closed under taking model companions and model-complete cores, which is an important property when studying the constraint satisfaction problem for structures from . We also show that Thomas' conjecture holds for : all structures in have finitely many first-order reducts up to first-order interdefinability.
Cite
@article{arxiv.1810.05657,
title = {Structures with Small Orbit Growth},
author = {Manuel Bodirsky and Bertalan Bodor},
journal= {arXiv preprint arXiv:1810.05657},
year = {2020}
}