English

Graph Information Ratio

Information Theory 2017-10-03 v2 Discrete Mathematics Combinatorics math.IT

Abstract

We introduce the notion of information ratio Ir(H/G)\text{Ir}(H/G) between two (simple, undirected) graphs GG and HH, defined as the supremum of ratios k/nk/n such that there exists a mapping between the strong products GkG^k to HnH^n that preserves non-adjacency. Operationally speaking, the information ratio is the maximal number of source symbols per channel use that can be reliably sent over a channel with a confusion graph HH, where reliability is measured w.r.t. a source confusion graph GG. Various results are provided, including in particular lower and upper bounds on Ir(H/G)\text{Ir}(H/G) in terms of different graph properties, inequalities and identities for behavior under strong product and disjoint union, relations to graph cores, and notions of graph criticality. Informally speaking, Ir(H/G)\text{Ir}(H/G) can be interpreted as a measure of similarity between GG and HH. We make this notion precise by introducing the concept of information equivalence between graphs, a more quantitative version of homomorphic equivalence. We then describe a natural partial ordering over the space of information equivalence classes, and endow it with a suitable metric structure that is contractive under the strong product. Various examples and open problems are discussed.

Keywords

Cite

@article{arxiv.1612.09343,
  title  = {Graph Information Ratio},
  author = {Lele Wang and Ofer Shayevitz},
  journal= {arXiv preprint arXiv:1612.09343},
  year   = {2017}
}
R2 v1 2026-06-22T17:37:23.376Z