Very weak zero one law for random graphs with order and random binary functions
Logic
2016-09-06 v1 Combinatorics
Abstract
Let G_<(n,p) denote the usual random graph G(n,p) on a totally ordered set of n vertices. We will fix p=1/2 for definiteness. Let L^< denote the first order language with predicates equality (x=y), adjacency (x~y) and less than (x<y). For any sentence A in L^< let f_A(n) denote the probability that the random G_<(n,p) has property A. It is known Compton, Henson and Shelah [CHSh:245] that there are A for which f_A(n) does not converge. Here we show what is called a very weak zero-one law (from [Sh 463]): THEOREM: For every A in language L^<, lim_{n-> infty}(f_A(n+1)-f_A(n))=0.
Keywords
Cite
@article{arxiv.math/9606230,
title = {Very weak zero one law for random graphs with order and random binary functions},
author = {Saharon Shelah},
journal= {arXiv preprint arXiv:math/9606230},
year = {2016}
}