Existence of Modeling Limits for Sequences of Sparse Structures

Abstract

A sequence of graphs is FO-convergent if the probability of satisfaction of every first-order formula converges. A graph modeling is a graph, whose domain is a standard probability space, with the property that every definable set is Borel. It was known that FO-convergent sequence of graphs do not always admit a modeling limit, and it was conjectured that this is the case if the graphs in the sequence are sufficiently sparse. Precisely, two conjectures were proposed: * If a FO-convergent sequence of graphs is residual, that is if for every integer d the maximum relative size of a ball of radius d in the graphs of the sequence tends to zero, then the sequence has a modeling limit. * A monotone class of graphs C has the property that every FO-convergent sequence of graphs from C has a modeling limit if and only if C is nowhere dense, that is if and only if for each integer p there is N(p) such that no graph in C contains the pth subdivision of a complete graph on N(p) vertices as a subgraph.