A Shannon multigraph is multigraph with 3 vertices for which either of the following conditions holds:
a) all 3 vertices are connected by the same number of edges.
b) as in a) and one additional edge is added.
More precisely one speaks of Shannon multigraph Sh(n), if the three vertices are connected by , and edges respectively. This multigraph has maximum degreen. Its multiplicity (the maximum number of edges in a set of edges that all have the same endpoints) is .
This nine-edge Shannon multigraph requires nine colors in any edge coloring; its vertex degree is six and its multiplicity is three.
According to a theorem of Shannon (1949), every multigraph with maximum degree has an edge coloring that uses at most colors. When is even, the example of the Shannon multigraph with multiplicity shows that this bound is tight: the vertex degree is exactly , but each of the edges is adjacent to every other edge, so it requires colors in any proper edge coloring.
A version of Vizing's theorem (Vizing 1964) states that every multigraph with maximum degree and multiplicity may be colored using at most colors. Again, this bound is tight for the Shannon multigraphs.
Referencesedit
Fiorini, S.; Wilson, Robin James (1977), Edge-colourings of graphs, Research Notes in Mathematics, vol. 16, London: Pitman, p. 34, ISBN0-273-01129-4, MR 0543798
Shannon, Claude E. (1949), "A theorem on coloring the lines of a network", J. Math. Physics, 28: 148–151, doi:10.1002/sapm1949281148, hdl:10338.dmlcz/101098, MR 0030203.
Volkmann, Lutz (1996), Fundamente der Graphentheorie (in German), Wien: Springer, p. 289, ISBN3-211-82774-9.
Vizing, V. G. (1964), "On an estimate of the chromatic class of a p-graph", Diskret. Analiz., 3: 25–30, MR 0180505.
Vizing, V. G. (1965), "The chromatic class of a multigraph", Kibernetika, 1965 (3): 29–39, MR 0189915.
External linksedit
Wikimedia Commons has media related to Shannon multigraphs.
Lutz Volkmann: Graphen an allen Ecken und Kanten. Lecture notes 2006, p. 242 (German)
April 11, 2024
shannon, multigraph, mathematical, discipline, graph, theory, named, after, claude, shannon, vizing, 1965, special, type, triangle, graphs, which, used, field, edge, coloring, particular, multigraph, with, vertices, which, either, following, conditions, holds,. In the mathematical discipline of graph theory Shannon multigraphs named after Claude Shannon by Vizing 1965 are a special type of triangle graphs which are used in the field of edge coloring in particular A Shannon multigraph is multigraph with 3 vertices for which either of the following conditions holds a all 3 vertices are connected by the same number of edges b as in a and one additional edge is added More precisely one speaks of Shannon multigraph Sh n if the three vertices are connected by n2 displaystyle left lfloor frac n 2 right rfloor n2 displaystyle left lfloor frac n 2 right rfloor and n 12 displaystyle left lfloor frac n 1 2 right rfloor edges respectively This multigraph has maximum degree n Its multiplicity the maximum number of edges in a set of edges that all have the same endpoints is n 12 displaystyle left lfloor frac n 1 2 right rfloor Contents 1 Examples 2 Edge coloring 3 References 4 External linksExamples editShannon multigraphs nbsp Sh 2 nbsp Sh 3 nbsp Sh 4 nbsp Sh 5 nbsp Sh 6 nbsp Sh 7 Edge coloring edit nbsp This nine edge Shannon multigraph requires nine colors in any edge coloring its vertex degree is six and its multiplicity is three According to a theorem of Shannon 1949 every multigraph with maximum degree D displaystyle Delta nbsp has an edge coloring that uses at most 32D displaystyle frac 3 2 Delta nbsp colors When D displaystyle Delta nbsp is even the example of the Shannon multigraph with multiplicity D 2 displaystyle Delta 2 nbsp shows that this bound is tight the vertex degree is exactly D displaystyle Delta nbsp but each of the 32D displaystyle frac 3 2 Delta nbsp edges is adjacent to every other edge so it requires 32D displaystyle frac 3 2 Delta nbsp colors in any proper edge coloring A version of Vizing s theorem Vizing 1964 states that every multigraph with maximum degree D displaystyle Delta nbsp and multiplicity m displaystyle mu nbsp may be colored using at most D m displaystyle Delta mu nbsp colors Again this bound is tight for the Shannon multigraphs References editFiorini S Wilson Robin James 1977 Edge colourings of graphs Research Notes in Mathematics vol 16 London Pitman p 34 ISBN 0 273 01129 4 MR 0543798 Shannon Claude E 1949 A theorem on coloring the lines of a network J Math Physics 28 148 151 doi 10 1002 sapm1949281148 hdl 10338 dmlcz 101098 MR 0030203 Volkmann Lutz 1996 Fundamente der Graphentheorie in German Wien Springer p 289 ISBN 3 211 82774 9 Vizing V G 1964 On an estimate of the chromatic class of a p graph Diskret Analiz 3 25 30 MR 0180505 Vizing V G 1965 The chromatic class of a multigraph Kibernetika 1965 3 29 39 MR 0189915 External links edit nbsp Wikimedia Commons has media related to Shannon multigraphs Lutz Volkmann Graphen an allen Ecken und Kanten Lecture notes 2006 p 242 German Retrieved from https en wikipedia org w index php title Shannon multigraph amp oldid 1143299930, wikipedia, wiki, book, books, library,
