Independence in generic incidence structures
Abstract
We study the theory of existentially closed incidence structures omitting the complete incidence structure , which can also be viewed as existentially closed -free bipartite graphs. In the case , this is the theory of existentially closed projective planes. We give an -axiomatization of , show that does not have a countable saturated model when , and show that the existence of a prime model for is equivalent to a longstanding open question about finite projective planes. Finally, we analyze model theoretic notions of complexity for . We show that is NSOP, but not simple when , and we show that has weak elimination of imaginaries but not full elimination of imaginaries. These results rely on combinatorial characterizations of various notions of independence, including algebraic independence, Kim independence, and forking independence.
Cite
@article{arxiv.1709.09626,
title = {Independence in generic incidence structures},
author = {Gabriel Conant and Alex Kruckman},
journal= {arXiv preprint arXiv:1709.09626},
year = {2019}
}