Add to ORKGGrünewald S. Chromatic index critical graphs and multigraphs. Bielefeld (Germany): Bielefeld University; 2000.We consider graphs and multigraphs which are critical with respect to the chromatic index. In chapter 3, we give a construction of critical multigraphs with exactly 20 vertices and maximum degree k for every k>=5. This disproves the weak critical graph conjecture. In chapter 4, we give a new method, how several 4-critical multigraphs can be constructed from a given 3-critical graph. In chapter 5, we prove that the edges of every planar graph with maximum degree 7 can be colored with 7 colors. This proves one of the two open cases of Vizing's planar graph conjecture from 1965
The problem of determining the chromatic index of the arbitrary graph G is known to be NP-complete. ...
AbstractLet G be a multigraph with maximum degree Δ and maximum edge multiplicity μ. Vizing’s Theore...
AbstractA chromatic-index-critical graphGonnvertices is non-trivial if it has at most Δ ⌊n2⌋ edges. ...
Grünewald S. Chromatic index critical graphs and multigraphs. Bielefeld (Germany): Bielefeld Univers...
A multigraph M with maximum degree \Delta(M ) is called critical, if the chromatic index Ø 0 (M) ?...
The object of this thesis is twofold: (i) to study the structural properties of graphs which are...
AbstractIn this paper, we prove several new results on chromatic index critical graphs. We also prov...
A k-critrical graph G has maximum degree k 0, chromatic index Ø 0 (G) = k + 1 and Ø 0 (G \Gamm...
AbstractIt is shown that the number of vertices of valency 2 in a critical graph with chromatic inde...
AbstractA graph is chromatic-index-critical if it cannot be edge-coloured with Δ colours (with Δ the...
AbstractA graph G is called k-critical if G is k-chromatic but every proper subgraph of G has chroma...
By Vizing's theorem, the chromatic index χ′(G) of a simple graph G satisfies Δ(G) ≤ χ′(G) ≤ Δ(G) + 1...
AbstractSeveral structure theorems on chromatic index critical graphs are proved. New lower bounds o...
AbstractTwo of the basic results on edge coloring are Vizing’s Theorem [V.G. Vizing, On an estimate ...
The problem of determining the chromatic index of the arbitrary graph G is known to be NP-complete. ...
The problem of determining the chromatic index of the arbitrary graph G is known to be NP-complete. ...
AbstractLet G be a multigraph with maximum degree Δ and maximum edge multiplicity μ. Vizing’s Theore...
AbstractA chromatic-index-critical graphGonnvertices is non-trivial if it has at most Δ ⌊n2⌋ edges. ...
Grünewald S. Chromatic index critical graphs and multigraphs. Bielefeld (Germany): Bielefeld Univers...
A multigraph M with maximum degree \Delta(M ) is called critical, if the chromatic index Ø 0 (M) ?...
The object of this thesis is twofold: (i) to study the structural properties of graphs which are...
AbstractIn this paper, we prove several new results on chromatic index critical graphs. We also prov...
A k-critrical graph G has maximum degree k 0, chromatic index Ø 0 (G) = k + 1 and Ø 0 (G \Gamm...
AbstractIt is shown that the number of vertices of valency 2 in a critical graph with chromatic inde...
AbstractA graph is chromatic-index-critical if it cannot be edge-coloured with Δ colours (with Δ the...
AbstractA graph G is called k-critical if G is k-chromatic but every proper subgraph of G has chroma...
By Vizing's theorem, the chromatic index χ′(G) of a simple graph G satisfies Δ(G) ≤ χ′(G) ≤ Δ(G) + 1...
AbstractSeveral structure theorems on chromatic index critical graphs are proved. New lower bounds o...
AbstractTwo of the basic results on edge coloring are Vizing’s Theorem [V.G. Vizing, On an estimate ...
The problem of determining the chromatic index of the arbitrary graph G is known to be NP-complete. ...
The problem of determining the chromatic index of the arbitrary graph G is known to be NP-complete. ...
AbstractLet G be a multigraph with maximum degree Δ and maximum edge multiplicity μ. Vizing’s Theore...
AbstractA chromatic-index-critical graphGonnvertices is non-trivial if it has at most Δ ⌊n2⌋ edges. ...