48 research outputs found
Simplicial decompositions of graphs: a survey of applications
AbstractWe survey applications of simplicial decompositions (decompositions by separating complete subgraphs) to problems in graph theory. Among the areas of application are excluded minor theorems, extremal graph theorems, chordal and interval graphs, infinite graph theory and algorithmic aspects
Graph Theory
This workshop focused on recent developments in graph theory. These included in particular recent breakthroughs on nowhere-zero flows in graphs, width parameters, applications of graph sparsity in algorithms, and matroid structure results
Minimal Connectivity
A k-connected graph such that deleting any edge / deleting any vertex /
contracting any edge results in a graph which is not k-connected is called
minimally / critically / contraction-critically k-connected. These three
classes play a prominent role in graph connectivity theory, and we give a brief
introduction with a light emphasis on reduction- and construction theorems for
classes of k-connected graphs.Comment: IMADA-preprint-math, 33 page