Monotone graph limits and quasimonotone graphs
Abstract
The recent theory of graph limits gives a powerful framework for understanding the properties of suitable (convergent) sequences of graphs in terms of a limiting object which may be represented by a symmetric function on , i.e., a kernel or graphon. In this context it is natural to wish to relate specific properties of the sequence to specific properties of the kernel. Here we show that the kernel is monotone (i.e., increasing in both variables) if and only if the sequence satisfies a `quasi-monotonicity' property defined by a certain functional tending to zero. As a tool we prove an inequality relating the cut and norms of kernels of the form with and monotone that may be of interest in its own right; no such inequality holds for general kernels.
Keywords
Cite
@article{arxiv.1101.4296,
title = {Monotone graph limits and quasimonotone graphs},
author = {Bela Bollobas and Svante Janson and Oliver Riordan},
journal= {arXiv preprint arXiv:1101.4296},
year = {2012}
}
Comments
38 pages