Large vertex-flames in uncountable digraphs

Abstract

The study of minimal subgraphs witnessing a connectivity property is an important field in graph theory. The foundation for large flames has been laid by Lov\'asz: Let D=(V,E) be a finite digraph and let r∈ V . The local connectivity D(r,v) from r to v is defined to be the maximal number of internally disjoint r→ v paths in D . A spanning subdigraph L of D with L(r,v)=D(r,v) for every v∈ V-r must have at least Σv∈ V-rD(r,v) edges. Lov\'asz proved that, maybe surprisingly, this lower bound is sharp for every finite digraph. The optimality of an L sufficing the min-max criteria from Lov\'asz' theorem may instead also be captured by the following structural characterization: For every v∈ V-r there is a system Pv of internally disjoint r→ v paths in L covering all the ingoing edges of v in L such that one can choose from each P∈ Pv either an edge or an internal vertex in such a way that the resulting set meets every r→ v path of D . The positive result for countably infinite digraphs based on this structural infinite generalisation were obtained by the second author. In this paper we extend this to digraphs of size 1 which requires significantly more complex techniques. Despite solving yet the smallest uncountable case, the complete understanding of the concept and potentially a proof for arbitrary cardinality still seems to be far.