English

Connectivity Functions and Polymatroids

Combinatorics 2016-05-06 v1

Abstract

A {\em connectivity function on} a set EE is a function λ:2ER\lambda:2^E\rightarrow \mathbb R such that λ()=0\lambda(\emptyset)=0, that λ(X)=λ(EX)\lambda(X)=\lambda(E-X) for all XEX\subseteq E and that λ(XY)+λ(XY)λ(X)+λ(Y)\lambda(X\cap Y)+\lambda(X\cup Y)\leq \lambda(X)+\lambda(Y) for all X,YEX,Y \subseteq E. Graphs, matroids and, more generally, polymatroids have associated connectivity functions. We introduce a notion of duality for polymatroids and prove that every connectivity function is the connectivity function of a self-dual polymatroid. We also prove that every integral connectivity function is the connectivity function of a half-integral self-dual polymatroid.

Keywords

Cite

@article{arxiv.1605.01455,
  title  = {Connectivity Functions and Polymatroids},
  author = {Susan Jowett and Songbao Mo and Geoff Whittle},
  journal= {arXiv preprint arXiv:1605.01455},
  year   = {2016}
}
R2 v1 2026-06-22T13:53:36.997Z